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English Pages 640 [635] Year 2021
PROCEEDINGS of the
FOURTH HAWAII TOPICAL CONFERENCE IN PARTICLE PHYSICS (l97l)
Edited by
D. E. Yount and P. N. Dobson
CONTRIBUTORS J. W. Cronin
J. D. Bjorken
G. H. Trilling
W. R. Frazer
Copyright ©
1 9 7 2 by The All
Library
of C o n g r e s s ISBN
Manufactured
University
rights
Press
of
Hawaii
reserved
Catalog
Card
Number
71-188984
0-8248-0210-1
in the U n i t e d
States
of
America
CONTENTS Preface
vii
WEAK I N T E R A C T I O N S AND C P - V I O L A T I O N James I. II.
THE I N T E R M E D I A T E FUNDAMENTAL TIONS
W.
-
EXPERIMENTAL
Cronin
VECTOR BOSON
3
P R O P E R T I E S OF WEAK
- SOME I N V E S T I G A T I O N S
INTERACBY
DIVERSE
TECHNIQUES III.
33
P R O P E R T I E S OF WEAK I N T E R A C T I O N S - SOME INVESTIGATIONS
BY
HIGH-ENERGY
TECHNIQUES IV. V.
62
CP V I O L A T I O N - E X P E R I M E N T A L THE K L + y " V
SOME T O P I C S
STATUS
80
PUZZLE
147
IN WEAK AND ELECTROMAGNETIC James D.
INTERACTIONS
Bjorken
INTRODUCTION I.
187
QUANTUM-ELECTRODYNAMICS J Jy M
STRUCTURE
IN WEAK
HIGHER-ORDER-WEAK II.
LIGHT-CONE
INTERACTIONS
189 PROCESSES;
HADRONS OBSERVED
. . . .
211
COMMUTATORS; MODELS OF THE
STRUCTURE IV.
T E S T S OF
INTERACTIONS:
PHENOMENOLOGY OF D E E P - I N E L A S T I C NO F I N A L - S T A T E
III.
TESTS;
HADRON F I N A L PROCESSES;
FUNCTIONS STATES GENERAL
i i i
231
IN
DEEP-INELASTIC
CONSIDERATIONS
. . .
242
V.
INCLUSIVE
PROCESSES
TRANSVERSE
SOME
ASPECTS
II.
DIFFRACTION
VERY
HIGH
MOMENTUM
OF
261
STRONG
George I.
AT
H.
INTERACTIONS
Trilling
PROCESSES
326
I.
Introduction
326
II.
Elastic
327
III.
Inelastic
THE
SEARCH
Diffraction
FOR
Diffraction EXOTIC
I.
I n t r o d u c t i on
II.
Total the
III.
IV.
375
Cross
Sections
for
System
Phase-Shift KN
RESONANCES
375
Channel KN
335
376
Analysis
for
the
I = 1
System
380
Phase-Shift
Analysis
for
the
I = 0
System V.
Remarks in
KN
386 on
Inelastic
States
Produced
Interactions
VI.
Conclusions
VII.
Other
391 393
Manifestations
of
Exotic
Channels III.
SU(3),
DUALITY
394
AND
EXCHANGE
DEGENERACY.
.
423
I.
Introduction
423
II.
Two
Examples
425
III.
The
Elastic
Scattering
SU(3)
Relations IV.
t-Channel
432
SU(3) iv
Relations
444
IV.
EXPERIMENTAL
ASPECTS
OF
MULTIPARTICLE
PHENOMENA
465
I.
Introduction
46 5
II.
High-Energy
Cross
III.
High-Energy
Multiplicity
IV.
A Simple
Sections
Example o f
465 46 7
Multiparticle
Production V.
Energy
469
Dependence
of
Secondary
Spectra VI.
471
Forward-Backward Non-Leading
V.
Asymmetries
for
Secondaries
473
VII.
Scaling
476
VIII.
Factorization
477
SOME T O P I C S
IN BOSON SPECTROSCOPY
. . . .
I.
Introduction
494
II.
The 2 + N o n e t
494
III.
Low-Energy
Kir and
TTTT
Spectroscopy
(£ 1 GeV) IV.
500
Higher-Energy
TTTT
and Kir S c a t t e r i n g .
MULT I - H A D R O N I C REACTIONS AT HIGH William I. II.
494
R.
ENERGIES
Frazer
INTRODUCTION GENERAL
507
537
FEATURES OF MULT I PART I C L E
REACTIONS
538
A.
Some V e r y
General
B.
Longitudinal
C.
Inclusive
Observations.
Kinematics
Spectra; v
Scaling
. . .
538 539 545
D.
Mueller Analysis
of
Inclusive
Reactions E.
Short-range
F.
Partial
Correlation Hypothesis.
Cross Sections
plicity III.
551
and
Distributions
The C h e w - P i g n o t t i
572 .
576
Diffractive-Fragmentation
Picture;
Hwa's Model C.
Statistical
576
Multiperipheral
Model B.
562
Multi-
SOME MODELS OF MULTIPARTI CLE REACTIONS. A.
.
581
Thermodynamical
vi
Model
. .
585
PREFACE The Physics Campus
Fourth was
through
the G r a d u a t e Commission, Physics
2-13,
University
Conference
of H a w a i i
Topical
held August
o f the
The
Hawaii
was
which
in
the
Particle
Manoa
Hawaii.
from
by the
University
Dean Wytze
Gorter
by the U. S. A t o m i c
supports and
1 9 7 1 , on
sponsored
a grant
Division;
Program;
of
Conference
the
local
of
Energy
High-Energy
by the U. S. N a t i o n a l
Science
F o u n d a t i on. The
sixty
physicists
met each morning again The
each
and
afternoon
principal
J. C r o n i n ,
but summaries
Physics
Report
were
given
S. F. T u a n , provided Chong,
seminars
are
talks,
contained
beyond
both
was
joined
seminars.
a n d W.
Frazer;
volume.
included
of
Notes
here,
by the
in a U n i v e r s i t y
hard
Professors
guidance
the C o n f e r e n c e
ably
met
Professors
prepared
past directors
essential
the call
not
and
authors Hawaii
( U H - H E P G - 5 1 1 - 1 0 9 - 7 1 ).
possible.
uted countless
by
in this
A n u m b e r of p e o p l e w o r k e d Conference
Conference
lectures
G. T r i l l i n g ,
are p r e s e n t e d
of t h e s e
are
principal
the
to h e a r c o n t r i b u t e d
J. B j o r k e n ,
contributed
themselves,
two
lectures
their papers
of the
for
attending
hours
of d u t y . by
of the
vi i
time,
once
Mrs.Caroline
again
cheerfully
contriband
effort, Mrs.
Roseman.
and
Conference,
and s u p p o r t .
In this
Mrs. J e a n
this
V. Z. P e t e r s o n
Secretary, of h e r
to m a k e
We a l s o
Chong wish
to acknowl edge the a s s i s t a n c e students
and s t u d e n t
Finally,
we are p a r t i c u l a r l y
lecturers,
lectures,
but a l s o f o r in a l l
grateful
not o n l y f o r t h e i r t h e i r a c t i v e and
phases of the
1971
vi i i
to the
suberb enthusiastic
Conference.
D. E. Yount P. N. Dobson,
December 7,
graduate
helpers.
principal
participation
p r o v i d e d by
Jr.
WEAK
INTERACTIONS
AND
James Enrico
CP-VIOLATION
W.
Fermi
* This
research
Energy
supported
Commission
Foundation.
and
EXPERIMENTAL*
Cronin Institute
Uni versi ty of Chicago,
-
Chicago
Illinois
in p a r t by the
by the N a t i o n a l
U. S. Science
Atomic
LECTURE I THE One
of the c e n t r a l
s t u d y of f o r the Active when
INTERMEDIATE
the w e a k boson
that mediates
of h i g h - e n e r g y
has
for
been
could
in
the
the
search
interaction.
this
o u t t h a t the
neutrinos
goals
the w e a k
searches
pointed
BOSON
experimental
interactions
experimental
it w a s
VECTOR
object
direct
began
interaction
be o b s e r v e d
at
existing
accel e r a t o r s . ^ At
low e n e r g i e s
described
by a c u r r e n t H
with
G = 10
analogy expect field
would
-5
with the
/m
2 P
w
.
interactions
x current
Here m
true
vector
interaction massive
nucleón
mass.
interaction
to be m e d i a t e d
quanta would The
boson.
well
interaction:
is the
P
are
J+(x), v
= - 4 J (x) /2 y
the e l e c t r o m a g n e t i c
B^, whose
mediate
the w e a k
fundamental
one
by a
be the
In might boson
inter-
interaction
become H W = 3g J V (x) B V (x). Two
currents
are
coupled
vector-boson
propagator.
tinguishable
from
coupling described
involves
to the m a s s normally charged
of the
called since
the
boson.
the w e a k
current
physical
momentum
W and
intermediate-
Such a coupling
the d i r e c t
above when
by an
x
The
currents 3
being
small
intermediate
is p o s i t i v e l y are
or
indis-
current
process
transfers
is
compared boson
negatively
charged.
The
is
small
coupling
constant g is
r e l a t e d to the
Fermi
c o n s t a n t G by
„2 w
/r
One can see t h a t the p r i m i t i v e becomes q u i t e s t r o n g
for large M .
expect semi-weak p r o c e s s e s duced to be q u i t e
f o r semi-weak Several
Hence one can
i n which a r e a l
important
very high energies
interaction
if M
is
W is
large.
Of
are r e q u i r e d to reach the
authors
to p r e d i c t i o n s
w
=
V f
i n some d e t a i l
(T7?>2=
3 7
'3
p a r t of t h i s
the e x p e r i m e n t s for
GeV/c2
"2
l e c t u r e we s h a l l t h a t have been
feature
the e x i s t e n c e
were i t to e x i s t .
review carried
common to a l l
I n a l m o s t e v e r y case the or n o n - e x i s t e n c e
depends on knowledge o f what i t s
following
led
the W b o s o n .
an i n t e r e s t i n g
these searches. concerning
type have
i s merely a s p e c u l a t i o n .
I n the f i r s t
There i s
of t h i s
electric
that
Of c o u r s e , t h i s
out s e a r c h i n g
threshold
have p o i n t e d out t h a t a n a t u r a l
Recent c o n s i d e r a t i o n s
M
course,
processes.
s t r e n g t h f o r g might be of the o r d e r of the c h a r g e e.
pro-
The W+ i s
W
p
information of the W
properties
would be
expected to have
decay modes: + v , U 4
of
the
1.+ W -v e + J. + ve, W + -»- h a d r o n s , _ 3 with
similar
W for
the
G
T
has
M
w
short
lifetime
The
difficult
pretations
shared The
beams
w
AGS +
1
the
is
Ge
2
V/c ).
not permit direct must
width
be
for
r e l y on
obser-
inferred
hadron
Hence,
= r(M + l e p t o n ) r(W -* all m o d e s )
_
equally
and
of
the
decay inter-
assumptions
ratio
assumed
produced
W+
+ Z
partial
to be ^ 0 . 5 ,
between
first attempts
Brookhaven v
does
=
to c a l c u l a t e .
the b r a n c h i n g R b
v^
(M
of m o s t e x p e r i m e n t s
B is g e n e r a l l y
lifetime
9 s e c
of the W, so its e x i s t e n c e
been
being
The
can be c a l c u l a t e d
10
*
its d e c a y .
about
.
17
= 7 r h
This
from
for U
leptonic modes
1
vation
decay modes
muon
to s e a r c h
by the d e c a y
and at the CERN + Z is the
. the
and
f o r the W
The
beams
b)
5
employed at
the
reaction
r e s u l t of two
a)
modes
electron.
of p i o n PS.
lepton
diagrams:
The
diagram
a)
The
cross
f o r the
uncertainty
the W.
The
The transfer Under
this
produced
condition so t h a t
in the
incident
strongly + v
E _ ^ y
E
forward
neutrino
polarized
is e m i t t e d
n o t be
given
on the
by Q
a n t i - p a r a l l el .
2 M /2 E . w v
of E^ is the W +
the W +
In the
tends
in the W +
backward
shell.
taken
is
Furthermore,
is l e f t - h a n d e d ,
of
momentum
. ^ mi n
share
direction.
which
except
momentum
the
(m,,/M,,), a n d ]i w
v
a
coherent
on the m a s s
largest
, the a n t i - l e p t o n ,
handed,
or m a y
largest when
the
with
mass
magnetic moment
depending
to Z is a m i n i m u m
by the W +
y+
may
is
the
can be c a l c u l a t e d
to p u t the p +
W production
virtually
upon
interaction
of a p o s s i b l e
nucleus
required
The v^
is c a s t
section
interaction
the e n t i r e
transfer
the
The
by an e l e c t r o m a g n e t i c
nucleus.
over
important.
into W + y ~ .
dissociates shell
is m o s t
is
decay
to be
since
W + ->
right-
center-of-mass
system. Thus slow
negative
lepton ture
a characteristic
at l a r g e
in the
case
s l o w y" w i t h having
very
kinematics great
muon
detail Five
of W +
a large
of W +
production
and a moderately
laboratory
little
of W +
release
transverse
production
in a r e c e n t
have
paper
distinct W searches
6
into
would
be a
The
discussed
by C l i n e have
signa-
hadrons
momentum. been
been
very
positive
A possible
to h a d r o n s
decay
energy
net
angle.
fast
is a
et
in
al.4
carried
out
with
neutrino
these
1 summarizes
is t y p i c a l
They
look
of the
muon.
Their
thick
Al.
between
ground
spark
the
the r e s u l t s
showers
results
chamber was which
shower.
from
seen To
The
the m o r e
of
cross
ratio
to
above.
e t al.
the m u o n
needs
B.
to the
The
from
the
the p i o n
1 shows
t h a t an e s t i m a t e
at the
(1)
and
can
absolute
observing infordata.
0.5. number
of the
by
the
noted
of the
edge.
the
of
(3)
section
This
B =
function
is g e n e r a t e d
7
and
production
ratio
high-energy
spectrum
by
decays.
by p a r t i c l e
sensitive
shape
spectrum
Figure
of the n e u t r i n o
back-
know:
cross
a branching
is a v e r y
to
uncertainties
determined
supplemented
shape
photon-
v^ + n
spectrum,
assumed
spectrum
a
muon-electron
authors
of e v e n t s
and a
reaction
neutrino
o f the n e u t r i n o
spectrum
mation was
a
distinction
f o r the W as a f u n c t i o n
leptons
subject
normalization
a
of the t y p e
section
be c a l c u l a t e d Burns
with
quarter-inch-
is a p o t e n t i a l
limit, one
(2) the a b s o l u t e
branching
experiments.
experiment.
set a lower
production
b u i l t of
shower
prolific
al.,5
et
be c o n s i s t e n t w i t h
permitted
latter
No e v e n t s
in the
of Burns
in a s s o c i a t i o n
that would
an e l e c t r o n - i n i t i a t e d
Y " + p + TT°.
mass,
track
plates,
initiated
The
I gives
neutrino-production
for e l e c t r o n
non-interacting
were
Table
searches. Figure
and
beams.
This
exact part
K-meson
decays.
Lack
of, k n o w l e d g e
is one of the
largest
of the n u m b e r
of e v e n t s
A CERN the W m a s s energy
slow p".
The
was
small.
quite
events
latter
Thus
case
since
it c a n
be c o m b i n e d
set a l i m i t on
W by m e a n s
B = 0.
being
with
high
a limit
slow
consistent with of the a b o v e
able
is an the
to s e t a
previous
a type
limit
important
independent
on
visible
a non-interacting
This
the W m a s s
spark-chamber of
its
established
tracks
produced
in the
from muons
potential
p a t h of s e v e r a l
t r a c k , as well
chamber
result
result
of the
to
branching
as
this
searched The
two
latter
interaction.
by t h e i r technique
a careful length
the
limit
non-interacting
interaction
interaction
for
strong
Pions inter-
requires lengths
calibration in the
a for
of
the
spark-
m a t e r i al.
The states
pi on
for
neutrino
In p r a c t i c e ,
also
mode.
by s e a r c h i n g
distinguished
effective
group
decay
actions.
each
prediction
B. A CERN
are
with
they were
in the
was
obtained
n u m b e r of c a n d i d a t e s
on M w
ratio
group
coupled with
the
in the
spectrum
expected.
by e x a m i n i n g
track,
high-energy
uncertainties
bubble-chamber
in h a d r o n s
negative
of the
combination
of the
t h a t M,, ^ 1.8 G e V / c 2 w
independent The
of the m o d e
upper
of
l i m i t on M
results with
90%
given
in T a b l e I
confidence,
decay. t h a t can
8
be a c h i e v e d
by
neutrino
production
neutrino
energy
these
limits
CERN
permits
In the n o t u n l i k e l y suffers
to e s t i m a t e
more
than
result
can t h e r e f o r e for
ble.
Here o i s
carried
first out
the A r g o n n e excess flux
expected
characterized ^
M
w
/2.
reduced
since
can
mass
protons).
result,
section.
section Q
range
in
this
no r e l i a b l e
A
varied
by
negative as
an
upper
kinematically cross
way
Specifi-
have
be e x p r e s s e d
us aing
from pion by m u o n s
incident
a n d his
basic
large
accessi-
section
in
angles decay.
with
protons
to
look
exceeding This
large
was
collaborators
idea was
from pion
for
the
excess
would
transverse
greatly
of the p i o n s
before
decay.
momentum,
falls the
high-transverse-momentum 9
rapidly
number
of
muons
an
be
momenta
can be
spectrum
at
muon
decay
the p i o n
transverse give
the
collision.
by a b s o r p t i o n
increasing which
only
The
The m u o n s
Further,
been
cross
by M. L. G o o d
at
at
of W's
incident
the W p r o d u c t i o n
ZGS.
that
a broader
of m a g n i t u d e .
W search
of m u o n s
over
has
cross
the m a s s
nucleon-nucleon The
production
there
of t h i s
four orders
on a w B
improved
e v e n t of a n e g a t i v e
the p r o d u c t i o n
limit
the
for
f o r 30 GeV
because
cally, estimates
highest
it is u n l i k e l y
one to s e a r c h o
(up to 6 G e V / c
method
and
by the
PS.
use of p r o t o n s
principle range
available,
limited
can be s u b s t a n t i a l l y
A G S or a t the The
is s h a r p l y
with pions is
greatly
decreased.
It is c l e a r
of W d e t e c t i o n
improves
course
is k i n e m a t i c a l l y
that M w
Figure ment.
2a s h o w s
They
production
simply angle
absorber close m i t t e d was
This
to the
measurements pion
production
and
a mass
2c.
also
be
2 - M
Here
of p r o d u c t i o n
neutrino
shield.
of b o t h
fixed thickness.
of
these
observed
came
l i m i t on
the
originated
was
of the p r o d u c t i o n
target
Brookhaven could awB
a small
be e x p r e s s e d
in a
by a
distance
as
as
a
the thick The
displacement upstream.
also y i e l d e d
- "34 ? cm / n u c l e o n ,
10
in
shielding.
evaluated
experiment
* 4x10
the
at
measured
a n d of d e p t h
yield
decays
out
flux was
angle
The muons
carried
against
result which
at a
The
- 3.
target placed directly
The
Fig. 2b.
set:
the m u o n
function
from pion
an
trans-
of a b s o r b e r
an u p p e r
experiment was
Brookhaven.^
at a
flux
in
muons
experi-
by p l a c i n g
measured
Analysis
that only
of
4xlO~34cm2-sr~1-GeV1/nucleon,
range
A similar
done
is s h o w n
t h a t all
of a W" c o u l d
muons
The muon
as a f u n c t i o n
indicated
B ^ for
flux was
in Fig.
decay
and
providing
f o r the Z G S
negative
target.
technique
accessible.
This was
then measured
is s h o w n
from
observed
(4 G e V / c )
increases,
the a p p a r a t u s
of 2 0 ° .
negative-particle momentum
as M
t h a t this
a
negative
p for a m a s s section
range
2 ^ Mw
is q u o t e d
b a s e d on a m o d e l
from
for W p r o d u c t i o n .
limit applies
particles
of e i t h e r
have
recently
to
R.
This
was
by i n c i d e n t thereby
low d e n s i t y A model
and
zation y
pion y
decay
this
was
to p a r i t y
strong
+
of a v i r t u a l
The experimental was
photon,
from
Forward
vector
muons the
tail
meson
longitudinal in
Muons
s o u r c e will
electro-
derived
be r e f e r r e d
from to
photon.
apparatus
designed
polari-
> while Any
conservation
heavy
suggest-
The
1•
any
at
density.
which
= =
target
varied,
their source.
interactions.
such e l e c t r o m a g n e t i c
longitu-
at h i g h
or f r o m a h i g h e r - m a s s to h a v e
protons.
decay
direction.
from a virtual
magnetic
apparatus
pion
rate
have a^'P^
due
the
constructed
on
by
sensi-
in a h e a v y
from
from W decay
and
and more
density was
a helicity
polarization
This
rate
depended
n o t be e x p e c t e d
as d e c a y s
produced
have
might come
collaborators^
to m e a s u r e
in the f o r w a r d
of the p m e s o n ,
any
a n d his
target
the muon
of the m u o n s
forward
would
The
of W p r o d u c t i o n
from
which
of m u o n s
suppressing
ed l a r g e y i e l d s
noted
of W
for W p r o d u c t i o n
designed
protons.
enhancing
It s h o u l d be
sophisticated
to s e a r c h
polarization
cross
measurements
the p r o d u c t i o n
K. A d a i r
tive experiment
dinal
A total
sign.
carried out a more
experiment
.
the d i f f e r e n t i a l
that this
More
* 6 GeV/c
is s h o w n
to m e a s u r e 11
in Fig.
the
flux
3a. of
muons
produced
of the the
Further,
could
lyzing
p o w e r of the
the m u o n s
to
was
location
was
not
decay
available
muons
of
positive
The
small
of the
muon
f i e l d as
flux
f o r the
the
of
ana-
directly caused
target.
selected same
the m u o n s
of
In
production
because
of
trajectory
appabeam
this can
the
Nor
since
multiple The
amount
pions.
the
of the
in the s h i e l d i n g .
properly
follow
source
because
a m o u n t of p i o n
spurious
magnetic
known
far upstream
a small
necessarily
of the
field which
the e x a c t
to a v e r y
to a l a r g e
of t h e s e
density
was m e a s u r e d
magnetic
experiment
sensitive
path
polarization
polarimeter
of the m u o n s
interacting
as o f the
function
precess.
muons
scattering
as a
in a p o l a r i m e t e r .
an e x t e r n a l
In t h i s observed
the
be m e a s u r e d
by a p p l y i n g
ratus
direction
s i g n of the m u o n , as well
target.
muons
in the f o r w a r d
lead
long
is the
they
sign
do
not
through
the
originating
from
the
target. Figure
3b s h o w s
function
of the
incident
beam was
decays
of pions
energy
as well
cles
and
evidence
reciprocal 28 G e V .
as
from
the
y-rays.
to a f i n i t e
for direct
of 2 5 - G e V
target
value
production
12
decays
fact at
as a
The
originate
the h i g h e s t
prompt The
muons
density.
The muons
produced with
virtual
extrapolate
the y i e l d
that
from
possible of W
the
infinite
if u p s t r e a m
parti-
yields
density pion
is
decays
are n e g l e c t e d .
The authors
for the diffuse
target is high, whereas
small
for the dense target.
argue that the e x t r a p o l a t e d
y+/y~
note that the ratio
it is very
From this fact they negative y i e l d is a true
prompt y i e l d , while the excess positive y i e l d is a measure of the possible c o n t a m i n a t i o n duced by scraping
of pions
the beam far u p s t r e a m of the
The latter a r g u m e n t assumes
protarget.
that the sign of the
produced upstream is properly
muons
designated.
The e x t r a p o l a t e d y i e l d s at infinite
target
density are found to be: ^ ^
) =
)
(4.3±0.6)xl0"35cm2-sr"1-GeV"1/nucleon,
= (2.7±0.6)xl0"35cm2-sr"1
The excess of y + W+
production.
G e V - 1 /nucl eon.
is a s s u m e d to give an upper limit to This y i e l d , when combined with
the
production m o d e l , gives a limit of CT,,B ^ w
6xl0"36cm2.
The prompt y i e l d of y~ is c o n s i d e r e d
to be a real
effect, being the negative c o m p o n e n t of y - p a i r s coming
from the decay of a virtual
this number represents
an upper
photon.
pure.
least,
limit.
The second phase of the e x p e r i m e n t , the part, failed because the signal
At
was not
elegant
sufficiently
Figure 3c shows the precession of the muon
asymmetry
for the two extremes of density.
13
The
polarization Figure
is l a r g e
3d g i v e s
the o b s e r v e d
t i o n of r e c i p r o c a l the f u l l - t a r g e t possible
dilution
do
for
the
decay
compared
The
pion
to the
precise
negative decay.
densities
polarization It is a p i t y
the
of h i g h
polarization
ciently muons,
might
since
transverse
transverse
very
to
pions
of
are
data not
it. consistent for
with muons
does
not
polarization. effect.
better
momentum. have
the s o u r c e
The
if
performed
In t h i s been of
case,
suffiprompt
are
produced
with
of y - p a i r s
produced
in
high
momenta.
The o b s e r v a t i o n nucleus
identify
few
they
large
might
15%
The
expected
fared
measurement
sensitive
point.
of the
have
from
to a 15%
that nature
expect a very
experiment
muons
are
At
high-density
and
to e s t a b l i s h
muons.
to o n l y
a t the
func-
of m u o n s
at most
such a dilution,
There, one would
with
amounts
low-density
p e r m i t an e a s y m e a s u r e m e n t
entire
fraction
density.
as a
the 2 5 - G e V
corresponds
d a t a a t all
large
no c h a n g e w i t h
polarization
of the p o l a r i z a t i o n
sufficiently
from
density,
This
not exclude
the
density
heavy-photon
the y + y i e l d .
point
and shows
collisions
W-production
cross
calculation.
The
of a W in an
permits
a better estimate
section
than
cross
inclusive
section
a purely f o r the
reaction,
p + Z ->• W +
+ a n y thi n g ,
14
protonof
the
theoretical production
can
by C V C 1 2
be r e l a t e d
to
the i s o v e c t o r
part
of
*
p + Z
y
+
anything
I-»- y + The mass
cross
section
is r e l a t e d
of the
same
physical
production
relationship
implies
non-existence
for W p r o d u c t i o n
to the
effective
+ y~.
production mass
of
as
that detected
about
of the W or w h a t
given
of virtual
two m u o n s .
nothing
at a
y-rays by
Of c o u r s e ,
the the
the e x i s t e n c e
its m a s s
might
CVC or
be.
T h e p r o d u c t i o n of y - p a i r s by p r o t o n s s t r i k i n g u r a n i u m a t 30 GeV has a l s o b e e n m e a s u r e d . 1 3 F i g u r e shows
the c r o s s
model-dependent quoted
is s o m e
section
da
+
y M
uncertainties. fraction
production
the
limited
to be * 65 m r a d a n d 12
GeV.
Lederman relation
as an
0 is the
constant, cross
and
section
A crucial is t h a t
angle
Pope
because
have
unequality
virtual
section y
was
the e n e r g y
4a
evaluated
which
had
/ V
2
d
V y d m
is the y - p a i r
assumption
as m e a s u r e d
in g e n e r a t i n g y-ray
fine-structure production on
this
is p r o d u c e d
p a r t of the e l e c t r o m a g n e t i c 15
CVC
\ /isovector'
da^+^_/dm
nucléon
the
states:
a n g l e , a is the
per
large
section
cross
Cabibbo
the v i r t u a l
isovector
cross
total
of the
rather
14
> A 3G " 2 T Â T Z T /2
% where
and
The
of the
because
to e x c e e d
_/dm with
4
uranium. inequality
only
by
the
interaction.
If the no
entire
relation
expression
production
could
The
vector not
the
vector
5 then the
such
importance
it s e t s
interesting
ments
to s e a r c h
of an a c t u a l
section
at NAL
by s c a l i n g
the
one
of
the
a function
The
cross
of W mass.
an e q u a l i t y
for
the
axial
part
cross
section
and
If the
present
limit,
the
should
the
CVC
by w h i c h
with
advance
above
finds
does
simply
assumption
t h a t M,, > 4 . 5 G e V . w
cross
for
part,
B =
0.5,
Considering
probably
be
cautious
limit.
a scale
W-production
most
a
the
one
limit of
taken with
uncertainties,
The
the
total
indicates
in a c c e p t i n g
that
as
part.
~36 2 - 6x10" cm , is
all
When
p a r t of t h e W p r o d u c t i o n .
to the
Fig.
lower
is e s s e n t i a l l y
in the
isoscalar
i sovector
for W production
interfere
adds aw
5 shows
relation
the
numerically,
M3 w
a, * 0 . 0 9 w
section
by
be e s t a b l i s h e d .
is e v a l u a t e d
Figure
went
relation, one can
section. respect
the
Its
to the
W at higher
measurement
energies, Brookhaven
one
however,
better
of
energies.
of t h e y - p a i r
can e s t i m a t e
y-pair
estimate
application design
is
its
experiment.
is
experiIn cross yield This
has
1 5 been
done
fits
the
using
the
Brookhaven
p r o d u c t ion c r o s s CVC
relation.
Drell-Yan data
section
Figures
parton
reasonably can
6 and 16
then
model, The
W-
be e s t i m a t e d
by
7 show
well.
which
the
predicted
the
values
for a w
f o r NAL a n d
It is i n t e r e s t i n g machines,
the
(1500-GeV
equivalent
25-GeV
= 20 G e V / c
10"35cm2.
a hypothetical
because
3 o f the M w f a c t o r w
noted
that
of 4 x 1 0
30
GeV.
of
in
high-trans-
background
is r e l a t i v e l y
in the C V C
of
small
relation.
Table
experiments.
gives
if the
ring
experiment
The expected y-rays
new
in e a c h
by o b s e r v a t i o n
from virtual
the two
two
have:
NAL a,, ^ w
muons.
While NAL
, we
respectively.
a n d NAL a t 400
5xl0~34cm2,
y-pairs
II c o m p a r e s
2
the
ISR a w ^
the W is d e t e c t e d
verse-momentum
ISR,
protons
lab e n e r g y )
L e t us c o n s i d e r which
the
to c o m p a r e
ISR w i t h
For a v a l u e M w
for
a much
higher
ISR r e a c h e s 100
(a f a c t o r
larger
rate,
it m u s t
its d e s i g n than
be
luminosity
at p r e s e n t ) , it
? can
probably
rate. same
reach
If NAL
unlikely,
reach
the m a s s A large
Fermi-momentum illustrated
of 3 7 . 3
for
a
measurable
boosts
that either machine
have
the W p a r t i c l e .
source
of proposals
It can
GeV. been
Table
of s o m e of t h e m w i t h e s t i m a t e s The
the
the
in Fig. 6.
n u m b e r of e x p e r i m e n t s
sensitivities. collection
the
however,
to s e a r c h
a summary
with
500 GeV, one m i g h t a c h i e v e
threshold,as
seems
at N A L
= 30 G e V / c
attains
limit because
effective
Mw
of t h e s e
submitted 17
to
data NAL.
of was
proposed III
gives
their the
At p r e s e n t o n e that M w
- 1.8 G e V / c
l i m i t and are
very
perhaps good.
discussed
III
sets
leptons.
observe
shows
prospects the W w i t h
are two may
certainty
only
to i m p r o v e
this
the
new
theoretical
be r e l e v a n t
machines
points
to s e a r c h e s
that W particles
be p r o d u c e d
scale
requi re a s i g n i f i c a n t
related
the v a l u e
to the
with mass
by p r o t o n s .
an a p p r o x i m a t e
Recently
been
The
with
for
energy.
can o n l y
experiments
has
.
below which
Table p
relation
can c o n c l u d e
There
the W at h i g h e r
GeV/c
p
The
for a .
> 10
CVC The
b r a n c h i ng rati o to
of the
branching
ratio
B
ratio16
p ( e + + e" hadrons) a /(e + + e - -»- y + + y -1) ' Indications
are
implies
0.5.
B ^
that
Considerations also
give
might
be.
some
this
ratio
is £
of h i g h e r - o r d e r
hint about what
Calculations
of the
K^ -»• y + y
a n d of the
rate
order weak
interaction)
1,1^
weak
interactions
the m a s s
of the W
K L — K^ m a s s
(contribution both
which
require
a
difference
from
second-
phenomeno1o
logical The
c u t o f f A in o r d e r
values
of A r e q u i r e d
respectively. encouragement if M w %
to y i e l d
finite
a r e ^ 4 GeV
Both of these
numbers
and ^ give
to i n t e r m e d i a t e - v e c t o r - b o s o n
A.
18
results. 20
GeV,
some enthusiasts
NOTES AND 1.
B.
Pontecorvo,
(1960);
M.
Soviet
Schwartz,
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K)_,
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801
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Block
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see
also
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C.
J.
K.
8.
9.
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G.
al.,
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See
for
example:
148,
1380
(1966);
Rev.
i]_9,
1410
Lamb e t
et
Report
F.
Chilton
T.
D.
65-32
Letters
al., et
(1964);
on N e u t r i n o
Phys.
Bernardini
608
C.
(CERN
Bernardini
38,
R.
Conference
Franzinetti
(1964); 86
Informal
1_2, 281
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al.,
et
Lee and
80
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C.
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Yang,
R.
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et
Phys.
(1960). al.,
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Letters
15,
800
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1_3,
Cimento
Phys.
N.
(1 965 ).
al.,
Phys.
Rev.
(1965).
19
Letters
1J5, 830
11.
P. J. W a n d e r e r 729
(1969);
D3, 2 5 8 2
13.
J. C h r i s t e n s o n
L. M.
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Nuovo
Lederman
S. D. 316
Letters
23^
et a l . , P h y s .
Rev.
Cimento
et a l . ,
193
Phys.
Rev.
(1966).
Letters
25,
(1970).
University 15.
Rev.
(1971).
Y. Y a m a g u c h i ,
14.
Phys.
C. M. A n k e n b r a n t
12.
1523
et a l . ,
a n d B. G.
(to be
Drell
Pope,
preprint,
Columbia
published).
and T-M. Yan,
Phys.
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Letters
25,
(1970).
L - F . Li
and
E. A.
Paschos,
Phys.
Rev.
D3>
1 1 7 8
(1971 ). 17.
For a r e v i e w e+e~
18.
beams
of h a d r o n
see
in
r e p o r t of R. W i l s o n ,
of the
Fifteenth
Energy
Physics,
R. N. M o h a p a t r a
production
International Kiev,
colliding P r o c e e d i nqs
Conference
on
1970.
et a l . ,
(1968).
20
Phys.
Rev.
1_71,
1502
High-
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to
21
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o E * —
FIGURE 1.
Cross-section calculate
2.
a n d flux
a lower
a) A p p a r a t u s prompt
used
calculated sole muon
in R e f .
function
of m u o n s The
on the b a s i s
of a b s o r b e r
through
solid
is
curve decay
is c a l c u l a t e d
on the
a) A p p a r a t u s
used
in R e f .
pion
the p o l a r i z a t i o n of m u o n s
c) P r e c e s s i o n
as
the
11
of m u o n s
solid
to m e a s u r e
that
the
yield
muons.
of t a r g e t
muons
target
The
decay.
as f u n c t i o n
two d i f f e r e n t
as a
assumption
of p r o m p t
of 25-GeV
d) P o l a r i z a t i o n
particles
thickness.
from
for
of
transmitted
of p i o n
negative
come
b) Y i e l d
5 to
source.
muons
and
in R e f .
9 to m e a s u r e y i e l d
absorber.
c) Y i e l d of 4 - G e V / c
3.
used
limit for M . w
spectrum 2
1165 gm/cm
all
data
muons.
b) M o m e n t u m
curve
CAPTIONS
brought
density.
to
rest
densities.
as a f u n c t i o n
of
target
13.
Solid
d e n s i ty. 4.
Measured lines
5.
show
Predicted relation
6.
Predicted 500
7.
cross
limits
due
W-production
section
in R e f .
to m o d e l cross
a n d d a t a of R e f .
dependence.
section
13 for
using
30 GeV
the
W-production
cross
section
for NAL
at
W-production
cross
section
for
at
GeV. 24
CVC
protons.
GeV.
Predicted 1600
dimuon
ISR
E o z1
o H o er o.
o
t-
u
LU CO
>-38
en co O er u z
o I-
o o Q O er
CL
O
CO
O CO
Fig. 1
25
9
SCALE :
?.. '9
feat
Fig.
2a
26
Fig.
27
3a
1/TARGET DENSITY
Fig. 3b
TIME leseci
Fig. 3c
(a)
E^ = 25.1
1
2
3
\/P
T
T
:
T • I
Fig. 3d
28
X
Fig.
4
i
i—
i
i
1
1
E 0 = 30 GeV -33
\
••
nr.• o •-34 t? C wD
' — — • > .
-35
-36
0
i 1
1— 1 1 1 2 3 4 5 6 Mw (GeV/c2 ) Fig.
30
5
1 7
Mh
(GeV/c2) Fig.
31
6
1
1
1
1
1.
•• -31 •• -32
.. _ 37 COLLIDING PROTON BEAMS 55 GeV ••-38 'E Q ' = 1 . 6 TeV -I 0
1 10
1 1 1 20 30 40 Mw (GeV/c2) Fig.
32
7
1 50
60
LECTURE FUNDAMENTAL SOME
INVESTIGATIONS
In this some
of the
actions.
PROPERTIES
II
OF WEAK BY
DIVERSE
l e c t u r e we d i s c u s s fundamental
We will
INTERACTIONS
the
properties
emphasize
-
TECHNIQUES investigation
of w e a k
the d i v e r s e
of
inter-
origins
of
the
i n f o r m a t i on. Bjorken^ leptonic gate.
for w h i c h
sively
stressed
processes
There
The
has
as the m o s t
are o n l y
there
first
the v a l u e o f the
two
is any
fundamental
purely-leptonic
experimental
,\ 1)
y
+
2)
v, + e~ ->- v + e e
e
process, ?
studied.
+
+ v
muon
e
to
investi-
processes
information:
+ v , y e~.
decay,
It is f u l l y
purely
has
been
exten-
consistent with
a
leptonic
c u r r e n t of the f o r m
+ Yg)m•
however,
do not e x c l u d e
modifications
the V-A form v to
interaction. (ay
less
(1 + y g )
than
asymmetry.
substantial
If the + 3y
.16 by m e a s u r e m e n t If
|g| w e r e
purely
of the d e c a y
verse
plane of
direction. they
If s c a l a r
can be as m u c h
contradicting
Further
progress
|3|
o f the
or t e n s o r
spin and terms
30% of the
33
to
in
the
limited
a 30%
the
are
vector
measurements
data,
electron
imaginary,
the e x p e r i m e n t a l
requires
is
electron would occur
the m u o n
as ^
without
is w r i t t e n
(1 - Y 5 ) ) u >
polarization to the
current
The
trans-
electron
permitted, terms
measurements. of the
angular
and s p i n c o r r e l a t i o n s
The muon decay a l s o low e n e r g i e s interaction
cross a(v
measurements the
The t h e o r y
where E^ i s
purely-1epton
has never been
e
+ e") = —
of E v = 1 0 8 GeV
2
TT
the l a b o r a t o r y
directly the
2 E ni % 1 . 5 x l 0 " 4 1 v e
energy o f the
S-wave u n i t a r i t y
out of the q u e s t i o n .
e s t i n g a t low energy because i n t e r a c t i n g with i t s e l f . by a d i s t i n g u i s h e d
at a v a l u e
it arises
mass).
in
The p r o c e s s
this is
There have been
speculations t h a t such a
c o u l d have a c o u p l i n g
from the n o n - d i a g o n a l
Experimental
evidence
inter-
from a c u r r e n t
group of t h e o r e t i c i a n s
interaction
quite different 4
section
E , v'
neutrino.
300 GeV i n the c e n t e r o f
Thus the e x p l o r a t i o n of the c r o s s
as p - d e c a y .
transfer.
to l o w e s t o r d e r p r e d i c t s
Such a f o r m u l a v i o l a t e s
"diagonal"
rather
to be
+ e" - v
region is
to
near the l i m i t o f zero momentum
section
e
limits
and o n l y e x p l o r e s
The second p r o c e s s observed.
neutrinos.3
of the
constant
couplings
such
places:
.1G < G d < 2G, -5 where G = 10
2 /m
and G^ i s
the d i a g o n a l
coupling.
The lower l i m i t comes from a s t r o p h y s i c a l5 arguments concerning
the r a t e of s t e l l a r
important e n e r g y - r e l e a s e emission,
e~
cooling.
process
e" + v g + v g .
is
neutrino-pair
The upper l i m i t
by an e x p e r i m e n t of R e i n e s and G u r r . ^ 34
Here the
They
is
set
observe
the
process v g
Savannah
+ e" -»• v g
+ e" u s i n g
River reactor.
signal, and a very apparatus
careful
is r e q u i r e d
It m a y
using v g
Los A l a m o s
Meson
able experiment Double
would
Facility
detect ^
beta decay
difficulties
are e x t e r n a l .
The
Te130
does
upper
produced
limit.
by A
the
reason-
events/day.'' second-order
not s u f f e r
because
the
(LAMPF).
is a g e n u i n e
Its c a l c u l a t i o n
divergence
5
any
neutrino-electron
stopped y +
Physics
of
a meaningful
to o b s e r v e
from
the
do n o t o b s e r v e
understanding
to g i v e
be f e a s i b l e
scattering
process.
They
from
all
the
weak
from
particles
decay
. Xe130
+
e"
+
e" + v
e
v . e
+
o has
been observed
of the m e t h o d isotopes
is to s t u d y
normal
for
done
samples
isotopes.
abundances.
With
by s t u d y
o u t o f the s a m p l e .
o f the The
is t h a t
Xe
1 30
is
xenon
half-
years.
of the of the
is in g o o d
the t h e o r e t i c a l
calculation,
This
somewhat more
interest.
r e s u l t has
t^
2
than
I n s t e a d of g o i n g by p r o c e s s 35
of
expected
This
ore Xe
1 30
agreement 22 5±2
with
the
strong
The
11? £
dating
diffusion
result
of
1 shows
of the d e c a y .
radioactive
essence
the e x c e p t i o n
Pi 34+0 to be t = i o £ 1 • •
by c a r e f u l and
The
Figure
The excess
the e x i s t e n c e
life w a s e v a l u a t e d was
ores.
of Xe 1 30 , the d i s t r i b u t i o n
the e x c e s s
evidence
of the
means.
the d i s t r i b u t i o n
in t e l l u r i u m - r i c h
distribution
for
by g e o l o g i c a l
= 10 cultural a), a
5 ^ .
neutrinoless
double
b) if t h e r e w e r e the s e c o n d final
spectrum. vertices 10
16
conclude
of the the
From 9
that
lepton
amplitude
and d o e s
same
conserving of l e p t o n
involve
key p o i n t s
of the
The w e a k various J The
first
which were
the
b),
electron
if the
be t ^
it is
two
=
2
can
process
is - 10
The
b)
upper
limit
non-conservation from _ p 10 is ^ 6 x l 0 ~
further
the
weak
useful
i
on
high-
.
interactions to w r i t e
down
the
theory.^
current
Jy
can
be d e c o m p o s e d
into
parts
= £ ,
qv)U
+
V 5
are
Let
2 m o y v 3gv )U = < B ' 1IV
^
f^
) U
li V 5
|
The
the
the
| | .
G
|l + >|
By the CPT
theorem =
But the d e c a y
rate
|| .
for E" is f o u n d
from
the
matrix
element |
e Ol sai CL X
o +1 LO VO o
1 1 1
o o CM
LO co 1—
o O) (O o •1— -C
z o: LU o
53
CTI • O
O XI -O •1— -O ia o
TABLE Recent AQ/AS
III Experiments
K -»• irev
Group
Events
Method
CalTech
( 0 < T
s
< 8 )
1079
SC, C -
K°A° 142
H BC,
K + p + K°pti
(prlm)
Padua
Freon BC Spi r a l i z a t i on
312
Illinois Northeastern CERN ORSAY Vienna
ioniz
(prlm)
K + n -»• K°p SC,
shower
TT"C -
400
A°K° 5800
Wire SC, C iK/ + p + K i/O p i +
P r e s e n t World Avg.
Im x
-0.069
0.108
+0.09 -0.07
±0.036
CERN SACLAY OSLO
Wi scons i n
Re x
(prim)
0.06
0.10
±0.10
+0.12 -0.10
0.11
0.04
±0.07
±0.09
-0.13
-0.04
±0.11
±0.16
0.05 +0.025 -0.035
-0.01 ±0.02
Re x = + 0 . 0 2 1 ± 0 . 0 2 2 Im x = + 0 . 0 0 3 ± 0 . 0 2 0 Re x 1 = 0 . 0 9 ± 0 .10 Im x '
54
= 0.01±0 .1 5
f K
iryv
TABLE Check Ratio
Y
of
IA11
IV
= 1/2
Rule
for
K -»• 3tt
of R e d u c e d Rates
ooo/f(Y+-o)
0.9910.04
Y++./4(Y+00)
0 . 99±0.04
Y+.0/2^+oo)
0 . 8 4 ± 0 .04
Y /(Y,, '000 ++-
0 . 83±0.03
- Y,„„) '+00
55
|AI| *
I A11
*
5/2
3/2
FIGURE 1.
Relative
abundances
rium ore. natural
The
CAPTIONS of Xenon
horizontal
abundances
isotopes
bars
in
indicate
o f the X e n o n
Telluthe
isotopes
in
the
1 30 atmosphere. 2.
a)
Decay
Note
scheme
b) S p e c t r u m
for 0 ^
arrow
ing
decay.
marking
c) D i f f e r e n c e
in r e g i o n of 1 2 8 0
MeV.
4.
Survey
of q u a n t i t y
nuclei
pairs
releases.
Ratio
of
as
Line
through
ir+ir°ir0 (x , + ) and K" -> ir"ir°T70 ( x ' " ) . 7
of They
(a + - a~)/(a + + a") = 0.009±0.006, and ( r ( x , + ) r(x'"))/(r(x,+)
+ r(x'"))
r a t e comparison i s
= 0.0017±0.0020.
r(x+1)
= r(x')
TT±ir°Y.
that
that the rates r ( x + ) +
+ r(x'").
The same group has a l s o compared the K1
-
The x'
three times as s e n s i t i v e as
f o r x because CPT r e q u i r e s
find
To see a d i f f e r e n c e , 82
one must
rates establish
that
in a d d i t i o n
mode
there
to
t h e n AI direct
1 = 1 .
= 1/2 term
and
find
tt"tt°y) )/sum under
be
unable With
by
bremstrahlung
a direct
hadronic
of
phase
data
and
transition
one m i g h t
is
If t h e r e
is a
with
inner
expect from
the
differences
the
Rutherford
to e s t a b l i s h
the
existence
a total
700
events,
of
Kycia
radiation
in a p - s t a t e
be e n h a n c e d .
= 0.06±0.05.
analysis
to
Preliminary
asymmetry
inner Such
it is o u t
term.
an
The
amplitude,
as y e t
of a d i r e c t they
if
rates.
are
term.
and might
bremstrahlung
group
normal
the t ^ t t 0
allow
have
in d e c a y
the
is a d i r e c t
term w o u l d hence
to
of ^
tt + tt°y)
(r(K+ A
and
similar his
-
r(K~
experiment
collaborators
is at
Brookhaven. One of
time
moment both
of
reversal of
time
value
the m o s t
of
the
is the
This
and
space
quantity
tests
search
neutron.
reversal this
sensitive
for
for
violation
an e l e c t r i c
requires
a violation
reflection.
expected
dipole
A
if t h e r e
of
typical
were
a C - 21 8
violation
in e l e c t r o m a g n e t i c
The
of
value
< 5xl0~23 The
search
a measurement
on,
electric
e-cm with
interactions
inverse
the
for
has of
reaction,
indicated
90%
dipole
moment
of C in
extensive.
is
10
now
compared
photo-disintegration failure 83
electromagnetic
A few y e a r s
n + p -*• d + y, w h e n
a possible
is ^
confidence.9
violation
been
transitions
of
the
of detailed
ago to
the
deuterbalance.^®
Recently greatly
two e x p e r i m e n t s improved
184"
The
identified gamma
chamber.
The
plotted
pal
background
are
They
detected for
in 4 e n e r g y
2 constraints
of
fit for
beam
flight. spark
distributions
in F i g . 4.
The
is n + p +
70 t i m e s
at
deuterons
in a m u l t i p l a t e
bins
to the
The
the a n g u l a r
section
out
a neutron
time
in the e x p e r i m e n t
has a c r o s s
carried
used
and
with
f i r s t , by a
spectrum.
by m o m e n t u m
results
are
which
energy
rays w e r e
The
g r o u p , was
Cyclotron.^
with a continuous were
been completed
statistics.
Berkeley-Michigan-UCLA the L R L
have
larger.
princid + ir° , There
the d e s i r e d
reac-
tion. One
can
see f r o m
agreement with
the e x t e n s i v e l y
reaction.
There
experiment
so o n l y
pared.
In this
figure
of B a r t l e t t
in the
region
shapes
et a l . ^
Bartlett
are
the
neutron
are
the com-
the
disagreement
energy. be
in
This
expected
of the A { 1 2 3 8 )
resonance
state.
a n d his
experiment with
circles
an e f f e c t m i g h t
of the f o r m a t i o n intermediate
MeV
normalization
showing
dis-
inverse
of the c u r v e s
the o p e n
of 5 0 0 - 6 0 0
is the r e g i o n w h e r e
in the
the
is no
measured
is no a b s o l u t e
points
because
Fig. 4 that there
colleagues
improved
have
statistics
repeated
and
a
their
simple
1 2 apparatus. last
This
to be c a r r i e d
experiment was,sadly, o u t at the P P A .
84
one of
Deuterons
the
were
a c c e l e r a t e d i n the machine and s t r i p p e d on an nal
target.
target. ^ 5%.
The a p p a r a t u s was p l a c e d 2 4 0 '
The n a t u r a l
inter-
from the
energy s p r e a d of t h i s
beam was
Momentum measurement of an i n c i d e n t
neutron
c o u l d be made to a p r e c i s i o n b e t t e r than \% by use of the i n t e r n a l The a p p a r a t u s used f o r
bunching of the beam i n the PPA.
is
shown i n F i g .
5.
No magnet was
the d e u t e r o n arm, which s i m p l i f i e d
e t r y and a n a l y s i s .
the geom-
About 10% of the e v e n t s were
n + p - > - n + p + TT° , but these f a i l e d the
kinematic
tests.
conversion
The y - r a y s were d e t e c t e d by t h e i r
i n a t h i n lead s h e e t f o l l o w e d by w i r e s p a r k
chambers.
The d e u t e r o n s were a l s o d e t e c t e d by w i r e s p a r k
cham-
bers and t h e i r momentum determined by time of
flight.
The e n t i r e experiment ran o n - l i n e w i t h the PDP-10 computer. straints
The n + p in t h i s
d + y events
had t h r e e
con-
experiment.
F i g . 6 shows t h e i r
results.
Again there i s
e v i d e n c e f o r any d i s a g r e e m e n t w i t h the i n v e r s e tion, and hence no e v i d e n c e at a l l time-reversal
no
reac-
for a f a i l u r e
of
invariance.
At p r e s e n t , t h e r e i s o n l y one experiment shows some s l i g h t
evidence for a p o s s i b l e
which
failure
of d e t a i l e d b a l a n c e .
This occurred in a study
the r e a c t i o n ir~ + p
n + y c a r r i e d out by a group
from UCLA and B e r k e l e y at the 184"
cyclotron.13
The m o t i v a t i o n f o r the experiment was r e a l l y
85
to
of
study of
photoproduction
the
inverse
target
of
The
the c r o s s
time
reaction,
required
periment.
The
deuteron
one's
surprise,
shown
in F i g .
A(1238
MeV).
of y
n
The
+
because
recoil
proton
lack
tions.
of
lack
and
effect
errors
the and
they
w o r k will be m a d e
(p)
in t h e come
spectator.
spectator
for a f a i l u r e
before of
no
which
is
from
of
chamber. for
small is
between
It is
the
measurement
there
conthe
conceivable
correction lead
required
to
the d e u t e r i u m that at
do n o t f i n d a d i s c r e p a n c y .
be r e q u i r e d
to
severe
can
out
u~p
region
of d i s t i n c t i o n
pointed
the
and
Here
the g e n e r a l
be
assume
in a b u b b l e
are m o s t
in h a n d l i n g
It s h o u l d
energy
One m u s t
of t h e it".
production
of a v i s i b l e
dependent
+
ex-
analysis
to c o m p a r e
points
corrections
fusion
for
+ p
deuteron
the
is a d i s c r e p a n c y
solid
it
(p)
of
this
there
study
reaction.
7 f o r an e n e r g y
angles
that
is g r e a t
By
photoproduction
target made
inverse
the
the y d m e a s u r e m e n t s
The
deuteron
avoids
uncertain.
to u s e
with
one
the d i r e c t
temptation
measurements
+
for
section
reversal
in t h e y - n c h a n n e l .
anglecorrec-
higher Much
a convincing
more
case
time
reversal
in
Conference
in 1 9 6 8 ,
o n e of
can
this
reaction. At major W. L e e metry
the
topics
Vienna
of d i s c u s s i o n
and c o l l a b o r a t o r s in t h e D a l i t z
was
which
an e x p e r i m e n t
by
found
asym-
p l o t f o r n -»• tt + tt 86
the
a small tt° . ^
The
asymmetry was This
1.5±0.5%,
experiment
the P r i n c e t o n riment was number
greatly
was
time-of-f1ight
produced
decays were on e i t h e r
slightly
the
direction chamber
by the PPA
A much more
permitted
The
detection
the s c i n t i l l a t i o n This due were
very
loose
collected here
210 ,000 e v e n t s was
found.
lab
they
charged
chambers
placed
of
in s u c c e s s i v e
sparksupplied
geometrical pion
completed
eliminated
effi-
in o n e
the
of
the
suitable magnet
of a s i n g l e
counters
threshold
the e l i m i n a t i o n
increased
trigger
to d i f f e r e n c e
Reported
an
reaction
by a l t e r a t i o n
fields
the
target.
was
problem
of
near
The
spark
hydrogen
of c l e a r i n g
planes.
ciency.
by s o n i c
the experi-
In the
at r e s t .
expe-
apparatus.
in the
produced
at
larger
s o m e of
the
backwards.
improvements
the f x ? s p a r k - d r i f t
a
previous
neutrons
essentially
detected
The
by a m e a s u r e m e n t
T h e n' s w e r e
s i d e of the
Among
in the
Fig. 8 s h o w s
of f o r w a r d
and were moving
repeated
Not only was but also
error
produced
T7~ + p ->- n + n.
been
events.
Accelerator.^
collected,
eliminated.
T h e n signal
recently
improved.
of s y s t e m a t i c
ment were
were
has
Pennsylvania
of e v e n t s
sources
b a s e d on 4 0 , 0 0 0
of
trigger.
possible
bias
of TT+ a n d IT .
in i n t e r a c t i o n
Data
+ - o + on b o t h N ->• IT TT IT and N -»• TT IT Y . is the r e s u l t produced
Fig. 9 shows
for
N
-»•
TT+TT
IT0
by 730 M e V / c TT". the d i s t r i b u t i o n
87
with NO
effect
of
events
by s e x t a n t asymmetry Shown old
in the D a l i t z as a f u n c t i o n
for c o m p a r i s o n
in the D a l i t z quadrant
plot
are
is
asymmetries
is no e v i d e n c e magnetic
variable
points
from
of the l e f t - r i g h t
(0.03±0.2)%. are
system.
X. the
M o s t of t h e s e on the o r d e r
have
and
(+0.08±0.2)%
experiment
in the
of the o r d e r
there
electro-
seen.
point
violation
We now
turn
and are
actually
nomenological
for
conceivable
if s o , t h e y
too
new
are
The
field
measure
searches
parameters
experiments at
of 10
to
achieved. situation
psychological
is the g u a r a n t e e That
are d e f i n i t e
88
have
for CP or T
a factor
can be
something.
to
be r e l u c t a n t
to the e x p e r i m e n t a l
system.
small
delicate
We w o u l d
in a c a s e w h e r e
in this
K meson
searched
It is
do e x i s t ;
in s e n s i t i v i t y
neutral-K
of w o r k i n g
10
to e n c o u r a g e
increase
have
any
_3
something.
except
neutral
to 0 . 1 % .
A r o u n d of e v e n m o r e
uncover
ingenious
to u n c o v e r
the
experiments
effects
of e ^
failed
outside
of
r\j
might
asymmetry
sextant
of e f f o r t , m a n y
experiments
t h a t CP v i o l a t i o n
been
improved
for a C v i o l a t i o n
t r a c e of a CP v i o l a t i o n
effects
The
respectively
In t h i s
seven years
and precise
will
the d a t a
the
decay.
After
the
10 s h o w s
of the D a l i t z
value
and ( - 0 . 0 7 ± 0 . 2 ) % .
100
Fig.
experiment. The m e a s u r e d
this
plot.
for
advantage that
i s , the numbers
one phethat
c a n be m e a s u r e d .
The
finds
understanding
that little
measurements.
disappointment
It a p p e a r s
t i o n c a n be e x p r e s s e d parameter K and all
e, w h i c h
to g o o d a c c u r a c y
is a m e a s u r e
of the c o n t r i b u t i o n from
this
situation
produces
the
it has
by F i t c h
taken
there was
the f i r s t
between
Be r e g e n e r a t o r
of
fact,
seems
|AS|
to of
which = 2 CP-
is
consistent
different
ther,
interference
the
of
produced
the CP v i o l a t i n g
showed by a
KL
of the
decays. effect
particles were eliminated. was m a x i m a l l y
result expected
amplitude
in Be w a s e s s e n t i a l l y
if the
p h a s e of E w a s ^ 4 5 ° , the v a l u e theory.
89
regeneration
expected
and
if
on the
later
this
the basis
sug-
confirmed.
parameters
the a u d i e n c e
Fur-
constructive,
imaginary
Six y e a r s
has b e e n
The CP-violating assume
this
performed
The experiment
the
possibility
to
possibility
e x p e r i m e n t was
which was
of the s u p e r w e a k
its
K- 2ir° peak and (2) the v e r y small assigned monitor
to the d i f f r a c t i o n
correction
under
error
f o r the 3tt°
events.
G a i l l a r d and h i s c o l l a b o r a t o r s arg(n00)
and the magnitude
i s very s i m i l a r
have
| n 0 0 | .^^
remeasured
Their
to p r e v i o u s measurements
technique
that
they
19 20 have made. a ratio
'
The magnitude
|n 0 Q | i s e v a l u a t e d
to the copper r e g e n e r a t i o n a m p l i t u d e
f-f/k
They f i n d 58 e v e n t s above b a c k g r o u n d , as shown Fig.
17b.
This
l e a d s to the
K o l / ^ l ^
GeV =
where | f - f / k |
is expressed
are r e l u c t a n t
to quote a f i n a l
certainty
in
true that
|f-f/k|
but s e v e r a l
|f-f/k|
as g i v e n i n Table
in
O-13±.12)xl0-3,
in Fermis.
The a u t h o r s
v a l u e because of
i s dropping r a p i d l y
in t h i s
seem to agree r a t h e r
It
unis
region, well,
III.
An a v e r a g e of t h e s e v a l u e s g i v e s 96
.
result
i n the r e g i o n of 2 GeV.
measurements
as
2.6±0.1.
We
double may
the e r r o r
occur
to ± 0 . 2
because
over
the s p e c t r u m
then
find The
the
discussed
in d e t a i l
two-dimensional I n Q o |/< |
and
for
be a c h i e v e d .
likelihood
20.
is the o r t h o g o n a l i t y The
9(ri00)-
This
dependence
The
analysis
complicated
The Fig.
The
technique 18 s h o w s
is
the
for
important
of the p h a s e
result
since inco-
plot they obtain
> and a r g ( n 0 0 ) .
We
experiment.
of c o h e r e n t f r o m
in R e f .
the m a g n i t u d e .
ar
this
the time
is q u i t e
separation
cannot
which
rapidly-varying
a regenerator.
time d i s t r i b u t i o n
error
by the e x p e r i m e n t .
by o b s e r v i n g
following
herent events
is
has r e m e a s u r e d
is d o n e
the e x p e r i m e n t a l
note
observed
same group
of 2tt° d e c a y s of
the a m p l i t u d e
= (2.9+0.4)xl0"3
|n00|
measurement
to t a k e a c c o u n t
point
to
determination
is a r g ( n 0 Q )
=
38°±25°. 20
When
this
is c o m b i n e d
they
find a r g ( n Q 0 )
=
with
the p r e v i o u s
experiment,
43°±19°.
We h a v e c o m b i n e d all the e x p e r i m e n t s w h i c h m e a s u r e d | n 0 0 l in T a b l e IV. We g i v e the v a l u e s p |n00l take
.
the e x p e r i m e n t of D a r r i u l a t
|n + _| = ( 1 . 9 4 ± 0 . 0 3 ) x l 0 " 3 .
source also
For
of t h i s
number
recomputed
all
from m e a s u r e m e n t s the xlO6
following sec"1,32
0.007),33
(We will
in a l a t e r
the v a l u e s
of
J
of r ( K ^ ^ 2ir°)/r(K L
constants:
discuss We
the have
derived 3tt°)
using
all)
=
(19.40±0.16)
F ( k l - 3 T ° ) / r ( K l - all)
=
(0.215±
r ( K $ + all)
r(KL
et a l . , w e
paragraph.) o |n
have for
= (1.160+0.008)xl010
97
sec"1,33
r ( K s + 77 + TT")/r(K s + ^ V ) f o r the w e i g h t e d
average
has
been m u l t i p l i e d
ing
value
for
= (2.22±0.03),34 is v e r y
poor.
by S = V x 2 / D F
The
The
= 1.7.
X
2
error
The
result-
| is 2 . 0 8 ± 0 . 1 6 . O n e c a n see t h a t 2 a m a j o r c o n t r i b u t i o n to the x comes from a single experiment.
|n
If t h i s
experiment
is r e m o v e d
the
? average note
hardly
changes,
b u t the x
that any background
raise
the Using
v a l u e of the
data
are v e r y
which goes undetected
have
from
The
all)
L
the m e a s u r e d
= 0.785±0.00733
ir + ir")/r(K^ -»• a l l ) . t i o n are g i v e n good.
The
in T a b l e
to the
large
iryv and irev d e c a y s No new m e a s u r e m e n t A new m e a s u r e m e n t The mass
in
|n+
branching
for is
residual
background
has
Am
ratio
calcula-
systematic
subtraction
error of
experiments.
been made
=
r (Kj_ +
embarrassingly
since
of this q u a n t i t y w o u l d
difference
the
| comes
this
in s o m e of the
of n + _
ratios
Here
in c o m p u t i n g
The x 2
T h e r e m a y be a small
in n + _ d u e
will
We use r (K^ -»• c h a r g e d )
input data V.
|ri + _|.
error
r ( K L ->- ir + iT~)/r(K L -»• c h a r g e d ) . /rU
and branching
re-evaluated
consistent.
almost entirely
We
|nQ0|.
same decay rates
c i t e d a b o v e , we
is i m p r o v e d .
be
welcome.
) - m(K^))
now b e e n m e a s u r e d by t h r e e g r o u p s to h i g h T h e s e v a l u e s are g i v e n in T a b l e V I . When
1966.
has
precision. these values 33
are c o m b i n e d
with
the
previous
f i n d s Am = ( 0 . 5 4 0 ± 0 . 0 0 3 5 ) x l 0 _ 1 0 riments
have d e m o n s t r a t e d
world average, sec-1.
Several
t h a t Am as d e f i n e d 98
one expe-
here
is
positive. of
49
This
value
leads
to a " n a t u r a l
phase"
42.9±0.3°. The
mits
precision mass-difference
increased
precision
a r g ( n + _) =
+ _ =
to the e x p e r i m e n t
in
41.8°±3°.
of Fitch
and
42 collaborators.
Here
in the
same e x p e r i m e n t
(+_ - f) a n d tp^. w e r e m e a s u r e d . included tematic
wire
chambers, which
evaluation
K^ -»• -rrev
events.
permitted
of the f r a c t i o n 99 U s i n g the
Their
of
results
both
apparatus a very
sys-
incoherent of
this
by
experiment slightly
a l o n e , one f i n d s
present value
its e r r o r
is d e r i v e d
its e r r o r
The crucial vectors
E||
1
shifts
the p r e c i s e
if the 6 ^ —
predicts
E
There
-
The |n+_|>
than
any is
of 5% of
e^.
small no eii.
One can o b s e r v e ,
incidentally,
-
R e f e r e n c e
x
2
50
2 . 2
, e3
51
0 . 1
,
52
1 . 3
e 3
a v e r a g e
=
3 . 3 2 ± 0 . 3 8
x
2
2
123
= DF
3 . 6
124
125
TABLE XI Contributions to Im a Formula
Quanti ty Im a (un, I = 2)
i §
- 3tt°)
(-14±44)xl0" 6
(-25±77)xl0 - 6
(50±370)xl0 - 6
Im a (tt tt ïï ) (CPT l i m i t only) 2 Im x r(K L •*• irev)
Im a (Trev)
2
Im a (ïïyv)
Sum
Assume n o o o
Im
x
r ( K
L
timv)
-3 Im a = (-0.03±.16)x 1 0
+-o
Do not assume n 0 0 0 = n + . 0 In a = (.05±.40)xl0 -3
126
(3±26)xl0"
(9±135 )xl0 - 6
127
FIGURE CAPTIONS 1
Apparatus
2
Preliminary
3
Comparison o f
4
Results
of
of W i l l i s
and
results t+
collaborators.
of W i l l i s
and x "
and
collaborators.
decay.
UCLA-Michigan-Berkeley
experiment
on
n + p ->- d + y . 5
Apparatus
6
Results
7
Comparison o f y + n ( p ) Solid the
of
of
Bartlett
Bartlett
points
et
et
al . , f o r
n + p
d + y.
al. -* i r ~ p ( p ) w i t h
are f o r w a r d r e a c t i o n ,
its
open
inverse. circles
reverse.
8
Apparatus
9
Results
of
t o measure n decay ri decay
asymmetry.
experiment.
10
Projected
asymmetries
11
Apparatus
t o measure
|noo|>
12
Apparatus
t o measure
|n Q 0 j » " b u l l s - e y e "
13
Reconstructed
14
Detail
events
i n n decay side
in tiqo
of
distribution
of
of
reconstructed
experiment. view. view.
experiment.
4y
events
in region
of
K mass. 15
Detail
shows d i s t r i b u t i o n 16
Angular
distribution
following Ks 17
a)
Shaded
part
background. o f a)
regenerator
events.
K^ •*• 6 - y
and b)
events
regenerated
4y.
Regenerated
events 18
of
4y
K-
A
^
(.0
(0
0.9
SLOPE: 0.8
Q >0.283 ± 0.005
0.7 -1.0
I
I
I
I I I -0.5
I
I
I
I 0
1 1 I
Y = (3T3-Q)/Q Fig.
131
3
I
I I 0.5
1 1 L.
1.0
C l Cl C exc. C « t \ ! C O "O •1O u "I
Ci "O CL a f c c c t ! ! •O •O C cL "O JK o < CNJ J f oo V (i oí -VJÉ V
CL
o O ^ Í8 V V V V
§
¿3C
-S tt 22 22 H
ss IÍ-, II
22 22
-np)
CL 'cS K C ( { 1 D• "O a •J T> o S c og î CVo J S3 "5 V V -V SÉ H" X)
0
22 22 ö Ô o a» "ai TJ a r a> > d - > n » p E X P
THIS EXPERIMENT ERROR E
o ANDERSON et. al - IX
Tn
342 MeV
0 BUON et ol.
- 2 5 * 360
A KOSE et al
» 3 X 380
Tn = 625MeV
i (X)
„
4
,
4
-
J
'
7314 EVENTS
H
,
„
l .5
o
' K i . -
.
o ANDERSON et al - I X 302 MeV 0 BUON et at
« 3 X 320
» CASSEL et al
-4X320
A KOSE et Ol
-3X300
1
1
1
Tn = 560MeV 11738 EVENTS , 4
i
o o l ä V S
t i ° n
rn
a ANDERSON et. al - I X 254 MeV o ANDERSON et ol - I X
302
t BUON et. ol.
« 3 X 280
' CASSEL etol
- 3 X 280
a KOSE et ol
* 3 X 260
1
1
1
1
I
Tn« 475 MeV 4464 EVENTS Ä XJf-
i
f
8 "
g
i
Ì
A
lft0
l l%
°
o
O ANDERSON et ol « I X 222 MéV .5
° ANDERSON et al. - I X 254 0 BUON et al.
>2X220
» CASSEL et ol
»3X240
a KOSE et. al.
» 3 X 220
30°
60*
90°
120"
Fig. 134
6
I5CT
BOT
135
V
HYDROGEN TARŒT 56" SPARK CHAMBER MAOMET
SPARX CHAMBER
50D56 SWEEPING MAGNET
' NEUTH3N COUNTERS
136
FIG.
137
9
Astnriercy
CVy)
1
!
}
New exrreci H c*JT
oca £sv 1 _ _ l ' ! » • • ¡ r¡ . 1 li. I /1 Illlll ! I . I o o o O O O O r J ™ inq pd S)uaA3 144
1
f
o
vo
tfl
r
_ eo
H
a
g
Id 2
a 0 so t 3 2
o
r i
T
r 145
§ »•a
146
LECTURE V Kl + y+y~
THE A study possibility weak
of the d e c a y m o d e of g i v i n g
interaction.
order weak
PUZZLE
important
This
decay
interaction.
tral-current
22
has
information
is f o r b i d d e n
It can
interaction,
y+y~
KL
proceed
the about
as a
by a) a
b) a s e c o n d - o r d e r
the
firstneu-
weak
23 interaction, decay.
o r c) a m o r e m u n d a n e
a)
As
one
b)
began
a great hope larger lower
than limit
culating
to p u s h
of s e e i n g the
rate
measured
the a b s o r p t i v e
1.15xlO"5
r(KL
one e x p e c t s
K^
r(K^
contributions
rate
there
c).
c) can be e s t a b l i s h e d
A by
p a r t of the a m p l i t u d e .
One With
related
^ 6x10"^.
amplitude
147
to
calThis
the
r(K^ + y + y ~ )
r ( K^ + y y ) %
y+y~)/all to the
finds
was
considerably
from diagram
is d i r e c t l y
yy.^
- yy).
limit down,
a decay
to the r a t e
rate
the
expected
p a r t of the a m p l i t u d e
shell
electromagnetic
-
5.2xl0"4, Off-mass-
cannot
interfere
with
the
absorptive
part.
A recent measurement
2
gives
a result
r(K^-*y
+
y~)/
-9 all
- 1.8x10
lower
than
the
theoretical come
with
other
limit
above.
the
on the v e r y This
y+y~
"K^
so we are
assumptions
sound
observation
puzzle."
fortunate
has
Physics
to h a v e
an-
that enter
yy
is the
2)
CP
invariance,
3)
no " a b s o r p t i v e "
4)
validity
of q u a n t u m
The
possible
c o n t r i b u t i o3n s
have
been
unitary
of t h e s e
opposite
limit
intermediate
states
limit
part
state,
in K L -+ y y , electrodynamics of o t h e r The
other
difficult
their
by no m o r e
than
effect 20%-,
to can
CPT.
possible
are tttttt ->- 2y a n d iriry +
are
that
and
intermediate
contributions, which
sign,
it is b e l i e v e d
unitary
only
considered.
intermediate
the
the
are:
The m a g n i t u d e s
all
as
based
1)
states
have
limit
significantly
one.
calculation
real
confidence,
given
on p u z z l e s ,
The
but
lower
to be k n o w n
thrives
90%
2y.
must
estimate, lower
the
i . e . , r ( K ^ -> y + y ~ ) /
5xl0"9.
^
L e t us t h a t has
look
provoked
the e x p e4 r i m e n t Frisch. ratus.
in s o m e this
puzzle.
is g i v e n
Figure
detail
1 shows
at the
A detailed
in the P h . D . a plan
It is a r e a s o n a b l y
experiment
view
thesis
of H.
of t h e i r
conventional
148
account
of J.
appa-
"K-meson
kit"
(an a p p a r a t u s K^).
designed
It is p l a c e d
at^3°
to an
in an
incident
to the
to o b s e r v e intense
proton
20'
long
two-body neutral
beam.
decay
The
decays
beam
produced
distance
the
target
region
is ^
The
decay
region was
evacuated;
early
excessive
background
of n e u t r o n
interactions
the d e c a y
region was
filled with
runs
helium.
of
from
25'.
showed
an
when
The
beam
5 intensity
was ^ 6x10
K^/pulse,
sity was
100
momentum
was ^ 2 G e V / c .
The
charged
parallel render
to 1 0 0 0
times
decays
parallel
Normally
a transverse
decays
c.m.
The
(sic)
K^ ->• TT+TT~ w e r e slightly
inward
206 G e V / c .
were
counter
a small Cerenkov to
spark
chambers.
hodoscopes
angular
interval
counters
identify Figure
were
K^ ->- Trev 2 shows
about
placed
the decays
transverse
momenta
to a c h i e v e can,
in
The
the
selected the
maximum
principle,
by
spark
magnetochambers
particles
parallel
between
of
trajectories
registered
Behind
which
in
deflected
alone.
were
to
MeV/c,
a b o u t 90°
events
by k i n e m a t i c s
of 225
set
and were
taken
care w a s
o u t of the m a g n e t s
strictive
have
K L -»• y + y ~
The
be i d e n t i f i e d
they
approximately
CP v i o l a t i n g
as a m o n i t o r
since
Great
resolution.
in a n d
used
inten-
K^
these were
momenta
to K^ -»- M + U ~ ordinary
The mean
rendered
corresponding system.
the n e u t r o n
greater.
were
by two m a g n e t s .
and
the
in
direction.
hodoscopes
decays. in m o r e 149
detail
a side
view
of
the
apparatus. placed
Beyond
a large
sure
the
of ^
1 nsec.
thick The
time
slowed
carbon
alternate being
the
scintillation of a r r i v a l Beyond
the m u o n s
layers
corresponded
hodoscope counter
counter
was
that could
of a p a r t i c l e
that a carbon
block was
graded
final
to a
precision
absorber
one
and s t o p p e d m o s t of the
followed
by a r a n g e
of s c i n t i l l a t o r
in t h i c k n e s s
so
approximately
pions.
the
range
to a u n i f o r m
meter
telescope
and steel,
that each
mea-
of
steel
bin
interval
of
momentum. The each
trigger was
extremely
a r m of the s p e c t r o m e t e r
simple;
was
a particle
required with
in
a
direction within
± 45 m r a d
of p a r a l l e l .
In
the
two d e t e c t e d
particles
were
to a r r i v e
the
large
counter within
This tween
timing
latter a slow
requirement proton
characteristic
required
6 n s e c of e a c h
eliminated
of the m u o n
in the
registered,
the
coordinates
of the
made
to a n y
trigger.
spark
When
chambers
tracks,
special
the
counters,
were
into
computer
on m a g n e t i c The
a PDP-9
of the the
were refer-
was Then
the
hodoscope
range
device
and w e r e w r i t t e n
out
tape.
property
established
and
be-
characteristic
fired.
status
the C e r e n k o v
No
a trigger
were
counters, read
coincidences
events.
at
other.
and a f a s t p a r t i c l e , w h i c h
of n e u t r o n - i n d u c e d
ence w h a t s o e v e r was
addition,
using
of the r a n g e K^g e v e n t s
150
device
and
Keg
could events
be
directly
(the
two
being d i s t i n g u i s h e d
by the Cerenkov counter).
results are shown in Fig. 3. behave correctly before entering Following
One can see that muons
and pions are largely the
attenuated
device.
kinematic r e c o n s t r u c t i o n
a hierarchy of cuts is applied. tum is d e t e r m i n e d by using line integral
of the
Initially
of field through the m a g n e t .
cross
Vertex:
The two e x t r a p o l a t e d
T a r g e t cut:
cuts
below.
tracks
The d i r e c t i o n of the
p a r t i c l e , assumed to have undergone
the
The
in the decay region w i t h i n m e a s u r e m e n t B)
events,
the m o m e n -
a single value for
made on the data follow the sequence given A)
These
must error.
parent
two-body
decay,
m u s t e x t r a p o l a t e w i t h i n the p r e s c r i b e d distance the K l production
target.
more conventional
cut on d i r e c t i o n of the
from
This is e q u i v a l e n t to the parent
parti cle. C)
The muon range:
The muon range m u s t be no
less than two counters plus three standard of range straggling its m e a s u r e d D)
deviations
short of the range p r e d i c t e d
by
momentum.
Orbit continuity:
When the sample has
been
reduced by the cuts A ) , B), and C), the m o m e n t u m the tracks field map.
is r e c o m p u t e d using a d e t a i l e d This
improves
throws out events of the magnet.
of
magnetic-
the m o m e n t u m resolution
that do not i n t e r s e c t in the
It also rejects
151
and
center
a number of events
of
the
type
K
iryv w h e r e
F i g3 u r e with
two
target
the v e r t e x signal,
the d a t a
cuts,
cut.
One
as well
the t i g h t e r mass
4 shows
as
cut.
the IT d e c a y s
as
spectrum when
the m o m e n t u m .
FWHM,
the
magnetic
fields.
calibration
Figure
Figure
is v e r y
8 shows
B ) , C) a n d The
a refined
data with
a tighter
3a s h o r t of
there
in this
K, -»• 7T + TT~
to MeV/c
calibrates and
the
absolute
applicable
cut. range
the
cut.
unitary
figure.)
for
for
Already limit
the
would
spectrum with of the
A),
momentum.
Fig.
survive
9 shows
the m u o n m u s t be
range.
From
MeV.
cuts
the o n e s w h i c h
cut;
cuts
spectrum
band around 498
Finally,
correct
normalization decays.
are
spectrum
the s a m e
calculation
are no s u r v i v i n g The
mass
events
continuity
not made
The
in a 2 - M e V
the o r b i t
than
range
low.
the y + y ~
cross-hatched
mass
6 shows
of the
predict ^ 8 events Figure
resolution
the y + y ~
6 shows
the a d d i t i o n
background
is the
is a l s o
TTTT
is 2.2
K mass
that
with
candidates.
A) a n d B) o n l y . with
This
resolution
to
violating
is u s e d
of the
of the m a s s
y+y~
the K^
position
CP
invariant
integration
The
for M 7T7T
in b a c k g r o u n d the
magnet.
in a d d i t i o n
clear
5 shows
a orbit
calculate and
the
the d e c r e a s e Figure
the
reconstructed
indicated,
can see
within
(The
either
the less
c u t D is
Fig. 8 or
9,
events. is m a d e w i t h
These
are
152
very
respect
similar
to
the
kinematically
to K^ •*• y + y ~ . calculated
The
relative
and v e r i f i e d
relative efficiency
efficiency
by actual
can be
measurement.
rate at the 225 M e V / c
magnet
rate at the 206 M e V / c s e t t i n g .
summarizes
the r e s u l t s
The a u t h o r s
of the
of the days w h e n
was m i s s i n g .
A quotation
repeating: prove
decays
Qualitatively
is r e m i n i s c e n t
5
do e m p h a s i z e
points
it u n l i k e l y
t h a t the y + y "
1)
With
for
some
without situation
is
worth to
an e v e n t t h a t has
The a u t h o r s
by the
Table I
impossible
been d e t e c t e d . "
suppressed
the
the d e c a y ir+ -> e + + v
"It is p h i l o s o p h i c a l l y
that m a k e
of
this
from the t h e s i s
that one c o u l d o b s e r v e
KL
experiment.
have s e a r c h e d e x h a u s t i v e l y
tt + tt~ d e c a y s .
suppressing
setting
could suppress y + y ~
mechanism which
The
is g i v e n by the ratio of the
Tr+7r~ c o u n t i n g to the
easily
never
a number decay
of
is
apparatus:
r e s p e c t to the t r i g g e r , tttt and yy
are
i denti cal. 2)
The branching
ratio
K
M
3/Ke3
is
correctly
measured. 3)
The s o f t w a r e w a s ing tt + tt~ e v e n t s
c h e c k e d by s u i t a b l y in the original
ters to s i m u l a t e y + y ~ through a single 4)
the p r o g r a m
been o b s e r v e d in
event
regis-
these
came
as y + y ~ w i t h o u t
loss
of
event.
Some y + y " e v e n t s
decay
events;
alter-
(with
from t + t ~
flight. 153
the w r o n g m a s s ) events where
have
both
This e x p e r i m e n t has been very well e x e c u t e d ; is i m p o s s i b l e f o r u s t o f i n d f a u l t w i t h
it
it.
In an e n t i r e l y d i f f e r e n t s i t u a t i o n , t h e m e t h o d o f t h e u n i t a r y - 1 i m i t p r e d i c t i o n s e e m s to w o r k . +
c a s e is f o r t h e d e c a y n -»• y y~ t o t h e d e c a y n -*• Y Y •
The prediction »
T h e d e c a y n -»- y+y~
, w h i c h can be
related
is
1.1X10-=.
h a s a c t u a l l y b e e n o b s e r v e d * * in an
e x p e r i m e n t w h i c h m e a s u r e d t h e y+y~
mass spectrum
d u c e d by 1 1 . 2 - G e V it" i n c i d e n t o n h y d r o g e n . mass spectrum.
m a s s is s e e n .
T h e r e is s o m e d i f f i c u l t y in
t h e o b s e r v e d r a t e to n
+
YY-
relating
Some cross sections
s u r e d , and the a u t h o r s c o n c l u d e =
for mea-
that
xio-5.
w h e r e the error reflects p r i n c i p a l l y in t h e n p r o d u c t i o n c r o s s s e c t i o n .
the
uncertainty
T h e r e s u l t is in
e x c e s s o f t h e u n i t a r y l i m i t , w h i c h is
reasonable.
One e x p e c t s a c o n t r i b u t i o n from the virtual
inter-
m e d i a t e s t a t e s as w e l l .
the
T h u s in t h i s c a s e ,
u n i t a r y l i m i t p r e d i c t i o n w o r k s , so o n e h a s s o m e f i d e n c e t h a t it s h o u l d w o r k f o r K^ effect intervenes.
y+y"
if no
T h e l a t t e r d e c a y is w e a k
e l e c t r o m a g n e t i c , w h e r e a s n d e c a y is e n t i r e l y magnetic.
10
A c l e a r p e a k at the n
in t h e s a m e e n e r g y r a n g e h a v e b e e n
fi;:
pro-
Figure
s h o w s t h e y+y"
n production
This
conother
plus electro-
It a d d s to t h e s u s p i c i o n t h a t t h e w e a k 154
part
of
the
decay
is
relevant
to
understanding
the
puzzle. The rate
to
y+y"
K^ K^
YY-
measurements measurement were
detected
the
energy
the
detection
chamber. the
by
of
tion
a single is
in
7.
branching
They
of
the
in
a
detect
also latter
observed
the
between
the
normalization
Y-ray
from
efficiency
6077
is
detec-
its
The
and
which
the
that
0.88±0.02.
of w a y s
of
and
Given
computed
with
plot
Y_ray
probability
a single
of
heavy-plate
The
steps.
to be
events
coincidence
a single
two
a variety
precise
center-of-mass
115 e v e n t s .
in
The
y-ray
several
K^ ->• Y Y
center-of-mass
computed to
in
the
most
Here the
measured
mate
relaK^ •*• yy
found
to
calculation
are
3ir° d e c a y s
discussed giving
a
ratio
r(K, B
- YY)
= T[K[
Recently measured
the
with
same
the
were
K^ -»• 3TT° is
checked
in R e f .
the
The
al.^ in
the
a two-dimensional
energy in
0.0213±0.0017.
was
shows
Y-ray,
efficiency to
et
on
review
rate.
second
3ir° d e c a y s
collected
compared be
11
to
the Y - r a y s
the
There
to
tive
decay
of
angle
is m a d e of
based
by m e a s u r e m e n t
Figure
Y-rays.
is
useful
Banner
center-of-mass
two
is
this
of one
colinearity
is
It
of is
puzzle
an
4
all)
=
(4.7±0.6)xl0
e x p e r i m e n t by Q
rate data
K^
yy.
This
that yielded 155
a Russian
|n
group
experiment | from
a
has
was
done
liquid-xenon found
58 c o p l a n a r
measurable, in Fig. and
chamber.
and
12.
K°.
IT
pairs
can
when
events
28 K^ e v e n t s
scanning
account. leads
The
of y - r a y s .
see
IT + and TT~ go f o r w a r d remain
0.95x10®
the m a s s w a s
One
The
Among
and are which
40
as
associated
K.
TT IT TT
not detected.
are
and m e a s u r i n g ratio
peaks from
equivalent
efficiency
K^ -> y y to
they
Of t h e s e ,
reconstructed
two
come
photos,
50
were
is
shown
w i t h TT° where
There
to 40
is
18500
the
events
taken
into
3TT° e v e n t s
to (4.6±0.9)xl0~4.
B =
g A previous similar
experiment
technique
finds
J. M. G a i l l a r d their n o o result tude
apparatus
is n o r m a l i z e d
at 2.2
by A r n o l d
GeV/c.
et a l . ,
K^ -*• y y .
to m e a s u r e to the
copper
2.6±0.2 B =
The
the ampli-
for
xlO"4.
^
where
and
values
+1
|K2>
hence
y+y~
state with
e amp(Ks with The
K«.) can
sec.
CP e i g e n s t a t e s
decay
They
-> y y ~ , CP = - 1 ) ^ a m p ( K L so
that destructive
limit: that
is a s s u m e d [ampiKg
[amp(K$
Done more
the b r a n c h i n g
eigen-
suggest
such
to
t h a t K^
an
that +
y y " , CP =
interference
y+y")]2 this
of
157
1),
occurs.
to be o f the o r d e r
+ 2 ->• y y )] ^ 0.1
carefully, ratio
with
by CP v i o l a t i o n
CP = -1 a t a r a t e
l + e | K.| > ,
and - 1 , r e s p e c t i v e l y .
(and
on
t h a t the
-1 sec" .
of
its
This
^ 0.1/4xl0"6
2xl04/
places
limit
a lower
r(K- - y + y ~ )
7
r(K* - a n ) and
5 x 1 0
>
K s ->• y + y " m u s t
the d e c a y
'
be l a r g e l y
It is a l o g i c a l ,
if n o t r e a s o n a b l e ,
the
hypothesized
CP v i o l a t i o n
its
source
decay
large
yy.
remark
it is w o r t h w h i l e well
as
model
y y".
which
but which
to e x a m i n e
+
Ks
not
Stimulated while
investigating
a n d K 66 23.
A good d i s c u s s i o n of s e c o n d - o r d e r weak actions
is given by H. P r i m a k o f f ,
Summer School
in Theoretical
163
See (1971).
inter-
Brandeis
Physics
(1970).
TABLE Summary
of
y+y~
K^
Vacuum Kl
I Experiment
Data
-»• TT+TT" d e c a y s
(corrected
for
E f f i c i e n c yJ
ratio
9 0 3 ,000
decay
e
in
flight)
/e 7T7T yy
63±3%
1,254,000
measured
and
No y+ y"
events
r (K^
y+y")/all
c ai
s-
a>
o
ai Oí
a>
CT 0 01
o ai
JD
s-
s-
-O
-Q
to
(O
-Q
a .
CL
co
ZS
co
ic Oco co II
4-
CM
ai 0 c
o
LO X
01 co «e
s_ a) 4(13
c a)
E
CU
01
S-
"=í I
E
o
LU
CTÍ
a) en >=r
» .—s
>-
+
i— r 03
1 O r—•
1 o i—
X
X
— ,*
X *—s
X ^ N
LO
O
CTI
CJ
00
o +1
1—
CSI
1—
+1 •
+1 >3•
j r en •i—
LO -—-
-—"
3
.—-
— '
+1 CO •
r». •
+1 LO •
O +1 LO •
LO -—•
—-
•—-
-—'
165
O 1— X —*
1 O 1—
s_
1 O i—
LO i—
1
1 O i—
t
_J
ra
ia
r—. "O
o
£
10 G e V , as
detail.
Kabir
A second
and
Kamal
constraint works
208
estimated in the
in
some
opposite
direction
and holds t h e W mass
the d i s p e r s i o n
relations,
down.
It
and e f f e c t s
comes
from
on t h e
low56
energy
scattering
Consider write
elastic
from the h i g h - e n e r g y v-p s c a t t e r i n g
the d i s p e r s i o n
relation
VP
(s) '
=
ds'
IT
f*
1
[ o
ds '
low e n e r g i e s .
(1.4)
a.
L sr 1 -_sr
vp(s,)
K p (
s
-
' )
+
As')
S +S
< V
S
'
s
'
) ]
V
We
again:
_ (s ' )
0
A
at
behavior.
]J
) ]
{ 1
-
-14)
o Avp
c a n n o t be l a r g e r
without
than 4 G / ? s ,
contradicting
for
s £ 1 GeV
,
experiment.
Thus ^ r
- a _ p ( s 1 ) ] £ 4wG/2
closure
the s h o r t
incompletely
theoreti-
letting
all
a simple final
eleinitial
state,
is u s e d a n d
|n> are
the
the simple.
observed,
too.
l i s t of p r o c e s s e s their status.
conferences
Llewellyn-Smith
That
is r e l a t i v e l y
in the m e s s
of
hand.
is a m a t r i x
in the
of a m e s s
from
and
lep-
deep-inelastic
advantage
from
is l e f t
or
problems
on one
section
operator
over, what
various
lepton
mess
squared.
|n> s u m m e d
But once the
then
a lepton
of s u c h
is a g r e a t the
current
deep-inelastic
One o f the big
a cross
state
mess
at m o s t
is t h a t the n u m b e r
in j u s t d e t e c t i n g
hadrons ment
observes
c a n j u s t a b o u t be c o u n t e d
is a p i t y , cally
PROCESSES;
HADRONS
where
processes
OF DEEP-INELASTIC
FINAL-STATE
In this processes
II
has
and
There
schools;
compiled
and
2-5
a massive
5 review
on the n e u t r i n o
upon quite 1.
heavily.
The
y~ + h a d r o n s
v ^ + p ( n ) -»• y " + h a d r o n s v +p(n)
which
deep-inelastic
e ~ + p ( n ) -> e" + h a d r o n s y~ + p ( n )
2.
reactions,
y++hadrons 211
I have
drawn
processes
are:
e++e"
3.
W*
hadrons hadrons
(via
p+p -»- y + + y ~ + hadrons
5.
Y+p
similar
y)
(if W exists!)
4.
The f i r s t
1
y+hadrons
two c l a s s e s
definitions
are very s i m i l a r ,
of the k i n e m a t i c s
and we use
and form factors.
We l e t E
= laboratory
E'
=
v
s E-E1 = laboratory
"
2 ^ Q
"
"
= EE 9
scattered
lepton,
energy of v i r t u a l
y or W,
= n e g a t i v e of s q u a r e of 4-momentum y or W, and
= /s = mass of produced hadron
Then the i n c l u s i v e
cross
gical
a p p r o x i m a t i o n m^ = 0 ; v
after
adopt^ n dda E ^ tt r d^n^c ''
x
Wg d e s c r i b e s
[!
2 dQda 5dv
. v E
2
+
system.
s e c t i o n f o r an
e l e c t r o n on a n u c l e o n may be w r i t t e n2 , 2
a nucleon.
lepton,
,2
of v i r t u a l W
energy of i n c i d e n t
v 2E
incident
i n the
pedago-
>> Q , which we h e r e -
2 2 i 2 4ira \ n Q 4A~ ,, W,(Q ,V) (2.1)
aT (_!_)]. a T S
the a b s o r p t i o n of the v i r t u a l
photon on
The second such form f a c t o r W^ i s ,
a phenomenological
p o i n t of v i e w , c o n v e n i e n t
i n terms o f the r a t i o
of a b s o r p t i o n
f o r l o n g i t u d i n a l l y and t r a n s v e r s e l y CO photons; R = a s /a^.. The advantage
21 2
cross
to write
sections
polarized is
from
virtual
t h a t a j and a^
are >. 0 , the r a t h e r well In f a c t ,
how
gross
the
structure fine
If one
and scatters
proton
tual-photon
different
from
then
the p a r a l l e l
product
of Wg w i t h
For a l e f t - h a n d e d
is
controlled
incident
lepton:
vir-
additional for an ti -
spin The
be w r i t t e n
elaborate
muon
to the
nucleon
a more
square
polarized
is an
alignment.
can a g a i n
depend-
or
the a b s o r p t i o n and
is.
a^/Oj.
of the
respect
there
of p h o t o n
in t h a t c a s e
ratio
electron
with
down
experimentally
section
structure
being
(2.1)
of p o l a r i z a t i o n
because
section
in
a longitudinally
direction),
alignment
cross
t h a t pins
that the
a polarized
from
structure-function, parallel
to e x t r a c t
in the
(longitudinal
bracket
it so well
details
has
i
+ ^ ( S
f
-
^
dQ dv
)
+
p
M
p
^
(^)2(Rp)]
2
) (2.5)
p
+ f ^ ( are S p ) d+e f i (n^e-d) 2 as ( L p i)n] where L p , S xp , [ R(Rp) p, etc.,
(2.3)
have the same i n t e r p r e t a t i o n .
the way to
f i n d out the r e l a t i v e helicity
contributions
muon energy s p e c t r u m . will
be n e c e s s a r y
of each.
Evidently,
i m p o r t a n c e of the L, R, S i s Clearly
The n o t a t i o n
various
to look at the
accurate
to d i s e n t a n g l e
and
the
measurements
contributions
g f o r the p r i n c i p a l
structure-
59 f u n c t i on i s what A d l e r
u s e d ; nowadays
it
is
often
c a l l e d W2. We now r e v i e w e l e c t r o p r o d u2c t i o n data.
and
In the space of s and Q , W2 i s
neutrino
rather
well
measured by the SLAC-MIT col 1 a b o r a t i o n ^ i n the region 214
shown
in Fig.
9.
cross
section
is r a t h e r well
R = cr s /a T where
and
= l+o)'
everything
Upon
versus
shown,
measured,
In the s m a l l e r one
plotting
finds
vW2>
2MV/Q2
variable
to g o o d
accuracy
the
b u t the
R to
be
is
variable
e
on a
ratio
region
which
the d i m e n s i o n l e s s
(or the
falls
region
R are m e a s u r e d ,
R a, 0.2 + 0 . 1 .
dimension!ess, s/Q2
larger
is n o t d e t e r m i n e d .
both W 2
small,
In the
%
u
u'),
universal o
curve,
shown
in Fig.
10, p r o v i d e d
1 GeV
is u s e d .
As w 1
a slow
decrease,
b u t one will
energy
machines
only
(or w)
data with
there have
to l e a r n m o r e
is
to w a i t
a b o u t such
Q
£
perhaps for
higher
asymptotic
behavior. Measurements dicate^
that
less
than
1.
that
these
on the
the
neutron
neutron-proton
While
neutron
it w o u l d
(in d e u t e r i u m ) ratio
appear
and proton
cross
is
from
in-
somewhat the
sections
data are
dif-
62 ferent,
West
corrections
for
corrections
tend
ference.
vW2
raised
the
nucleons
to r e d u c e
B u t the e f f e c t
high-momentum tions,
has
components
a n d to s e t t l e
in the
mentally
in
the
issue the
of
Fermi-motion
deuteron;
neutron-proton
is s t r o n g l y
dif-
sensitive
in the d e u t e r o n
wave
to func-
measure
r e g i o n ^ < co £ 1 a n d d e t e r m i n e
experi-
high-momentum Another
issue
the
one s h o u l d
how m u c h
the
the
is b e i n g
contributed
there
by
components. feature
of the 21 5
data which
is
very
the
interesting threshold by
Bloom
instead
and
of
considerable
behavior and
of
for
Gilman
the
small t h a t , if
earlier
rather
the of
low
scaling how
Bloom
and
£
curve
1 GeV (Fig.
works
Gilman
, the
in
propose
which
resonances, average
the
there
is
clearly
dependence
of
the
havior here
of
the
digress
argument such
from
goes.
exclusive
fact,
to,
w1
even
account of
and
curve,
is
and,in
We
shall
scattering.
near
the
scaling
connection.
The
Q -
threshold
be-
=
us
there
from
that
the
argument
curve,
the
1.
give
and
the
oscillations,
between
w'
this
that
the
fact,describe call
for
for
the
reasonable
reminiscent
presume
a connection
phenomenology
it
very
about
phenomenon
if w e
resonances
a connection
nection
found
versus
oscillate
is
same
behavior
scaling
on w h y
It
the
nucleon
then
vWg
variable
pion-nucleon
In
do
the
It w a s
plots
data
11).
electroproduction.
really
one
u').
is
2
Q
duality
(or
traditional
2 at
w
importance
Let a
theoretical
should how
be
the
con-
inclusive-
is
somewhat
di f -
64 ferent We can
shall be
frame
used
including
as
just
one in
any
one
kind
the
it
in
could
spectrum
and
general
of
measures
a function
Bloom
rather
measurements
production or
it
for
Suppose dN/dp
the
Gilman
terms
inclusive
ordinary some
hadron
In
the
case
be
either
vW^
as
scattered
it
processes.
inclusive
p.
216
because
measurement,
of
of
give.
of
spectrum electro-
function
electrons
of
which
v, is
actually
measured.
for w h a t
the d i s t r i b u t i o n
region
of l a r g e
We a s s u m e w e
energy
endpoint
of the
observed
possesses
the m a s s
is so small
a region
near
less
mass;
than some
fixed
that there
duced
resonance
outside
the
prominent
resonances
inclusive
(missing-mass)
dynamics
in the
region
exchange
multi-Regge there
varies
as we e n t e r
other
know
resonance-region channels down. cess
is c o n f i n e d
mass
of the
are
a finite
but
that
the
resonance
are
in the
in
region
which
n u m b e r of can go.
system
region
the
217
other
the
in
the
number
system
is
in s p a c e
the
angular
pro-
and
then
of
going
if the
into which
The m a x i m u m
or
In
On
is b o u n d e d ,
channels
be
smoothly
region.
resonance-region,
curve
example,
applies.
because
Now
the
theoretical
unobserved
to a f i n i t e
pro-
inside.
that some m o d i f i c a t i o n
to the
the
the
easily
could,for
still
is
2 GeV.
of m e s o n s , m u l t i p e r i p h e r a 1
unobserved
system
endpoint
no r e s o n a n c e s
the
(which
not
unobserved
a m o u n t , say
for
is n e c e s s a r y
available
In f a c t ,
observed
the
is s o m e m a t r i x - e l e m e n t
h a n d , we
the
is
as
resonance
diagrams, etc.)
words,
that
we d e f i n e of
are
the
There
region,
the
inclusive
happens.
experiments
responsible
inclusive
t-channel
system
t h a t are o b s e r v e d
t h a t as we e n t e r
expression
Near
beyond
the m a s s
That doesn't mean
basic
the
the e n d p o i n t , w h i c h
system
assume
12).
that nothing
region, where
an
be in the
(Fig.
Pmax
a small
resonance is
should
loss
spectrum
have
the
there un-
momentum
in t h e s e only
channels
a finite
Everybody one into
bounded,
of p a r t i a l to do
individual
of the
waves
inclusive
partial
enhancement
and
therefore
contribute.
in a s i t u a t i o n
up t h e o r i g i n a l
final-state effect
number
knows w h a t
breaks the
is a l s o
waves
factors
resonances.
like
matrix
and
then
element puts
to a c c o u n t
It is c a l l e d
that;
for
in the
the O m n e s
or
65 N/D m e t h o d ,
or the W a t s o n
S o , w h a t has inclusive region
cross
into
final-state
happened?
section
a finite
The
of w h i c h
channels
is p u t a f i n i t e
factor.
Therefore, what ensues
the sive
resonances curve
angle, etc.
resonant.
waves,
enhancement
is t h a t
in
the
extrapolated
inclu-
unity.
statement
This
there
is no s y s t e m a t i c
parameter
coming
in,
of this
experiments
doesn't mean
like
the
conclusion
nal
9
this
electroproduction? of the
are,
is of o r d e r
connection
say
Experimentally prominent
218
de-
scattering
is
can be d o n e :
r a t i o , no m a t t e r w h a t
Einc>
that
transverse-momentum,
signal-to-background
production
resonant
to the a r e a of the
t h a t the e x c l u s i v e
W h a t does
a finite
of
beam energy
conditions
resonance
contribution
1, b u t t h a t
Another
the
of the
on any e x t e r n a l
the
smooth
In t h o s e
Breit-Wigner
ratio
is of o r d e r
it is r e a l l y pendence
the
in
of p a r t i a l
fraction
resonance-region
is
original
is d e c o m p o s e d
number
theorem.
just the
the
exter-
unity.
in the
case
it is f o u n d
N* r e s o n a n c e s
fall
of that off
at
large then
Q
2
in a b o u t
of the o r d e r
bution, which VW^1 What
'V [ G 2 about
rises From
the
s u m of them
of the e l a s t i c - s c a t t e r i n g
+ (Q2/4M2)G2] the
region
(Q2)"3
6(1-w) ^
background?
is
contri-
Assume
(Q2)"4.
or
the s c a l i n g
curve
the e n d p o i n t : vWg ^ (to'-l)'3. S of u 1 = 1+—~ we see t h a t the Q
near
definition
So the
The
is
as a p o w e r
resonance 02 .
the s a m e w a y .
extends
to the p o i n t u>' ^
inclusive-exclusive 1+const
connection
l+(const)/ gives
Q2 inclusive a r e a in resonance region
du>' [ v W ? ] ^
! P+l (-i) Q
1
(2.6)
s u m of a, £ rn^i resonances Thus
p = 2 to 3, in g o o d
In g e n e r a l ,
if the
form
-(3
to 4)
agreement with factor
G falls
the off
data. as
(Q
2
n )" .
then p = 2n - 1 , a connection parton to
model.
inclusive
tures)
states
f r a g m e n t4.a t i o n
first found
In p a s s i n g , hadronic
region
a(t)
is
the
6
and Y a n ^ ' ^
the s a m e
reactions
that near
U where
by Drell
(2.7)
argument
(cf.
Frazer's
the e n d p o i n t x = 1 in
using the applied lecthe
8
-
Regge
(l-x)1_2a(t), trajectory
219
which
(2.8) controls
the
S-dependence
of the exclusive
processes which
bute near the e n d p o i n t of the inclusive We now turn to the neutrino cross which are very closely tion data, so closely
related to the
additional
plausibility
actions
This always
sections, electroproduc-
(CVC) hypothesis
and
processes
presumes
c u r r e n t - c u r r e n t coupling.
that the weak
local
at NAL.
in
fail
If so, the whole
at
ques-
laws, etc., would appear very dull structure
was
down.
Putting
that possibility
the connection production.
aside, let us
between e l e c t r o p r o d u c t i o n
and the weak
tions are of order sin 6 C ^ 5 % .
actual
it is s u f f i c i e n t to
set the Cabibbo angle 6 C to zero, because 2
the
correc-
Furthermore,
separation of strange from non-strange even in bubble c h a m b e r s , is likely some time.
establish
For probably a long time in the
analysis of neutrino experiments
processes
inter-
that this will
compared to how the w e a k - i n t e r a c t i o n breaking
out
One always has to keep
mind that it is not improbable
tion of scaling
an
semiquanti-
are d e s c r i b e d by the conventional
the very high energies
the
a r g u m e n t , one can rough
w h a t to e x p e c t in the neutrino tatively.
spectrum.
related that just from
conserved-vector-current
contri-
final
the states,
to be terrible
for
With 6 C = 0 and only AS = 0 neutrino to c o n s i d e r , we know that the vector
of B(v,Q 2 ) (as o p p o s e d to a x i a l - v e c t o r )
220
is
part
related
directly
by CVC t o t h e i s o v e c t o r
production
structure-functions,
from both i s o t o p i c - v e c t o r The c o r r e c t [W
p a r t of t h e which has
and s c a l a r
can be w r i t t e n
(v,Q2)
W2n(v,Q2)].sovector
+
contributions
hadron
relation
electro-
currents.
(2.9)
i =
2
2 [3p(v,Q )
2
+
3n(v,Q )]vector. AS = 0
However, from e i t h e r or o f sum r u l e s Section nates;
III,
the i s o t o p i c
e.g.,
of v e c t o r
dominance
and p a r t o n models t o be d i s c u s s e d
vector
and 1 / 4 i s o s c a l a r the a x i a l - v e c t o r all
the v i e w p o i n t
vector
contribution
dominance p r e d i c t s ^ 3 / 4
contribution contribution
to
domiisovector
With r e g a r d
t o weak p r o c e s s e s ,
t h e p a r t o n m o d e l s , t h e Gel 1 - M a n n - F r i t s c h
cone a l g e b r a , ^
in
and o t h e r sum r u l e s
to
almost
light-
from c u r r e n t
algebra
suggest^ B(v,02)axial Finally etc.]
(for
gives
neutrino
6C = 0 ) , relations
% 8(v,Q2)vector. charge-symmetry
(2.10) [cr w + p •
between t h e a n t i n e u t r i n o
structure-functions
appearing in
tfy-p» and
(2.4)
and
(2.5): =
P
n
8„ = B_ > n p
U
p
is well
We s t a r t
n
J
L
n
= L > p
R_ = R n > p n
R„ = R_ > n p
estimate do —
2 P
dQ From
we
+
dv
2d
(v
'
q2
^
£1
"
M
V
1
^
d
-
(2-14)
E
the s c a l i n g b e h a v i o r in e l e c t r o p r o d u c t i o n v W ? n = F (x), x = Q2/2MV = 1, (2.15) £p p to
draw
two
1ting
- If"
2 W
conclusions: r i s e s
°tot
(2.14)
linearly
with
energy.
gives 1
ave
%
(G2^)
tOt
which,
7T
even
Integra-
2
dx
considering
F (x) ^ 0 . 3 6
the
above
2 ( O i )
(2.16)
assumptions,
is
70 probably 2.
g o o d to b e t t e r t h a n a f a c t o r o f t w o . The t r a n s v e r s e - m o m e n t u m d i s t r i b u t i o n of 222
the
muons
is
spectacular;
let
E = 100 GeV; E '
= 50 GeV.
Then 2 A
^ 2 dpf which
is
several
plotted GeV i n
celeration magnetic a sober
in
of c h a r g e ,
of
question
rent-algebra There
in
for is
of
sum
are
the way, w i t h is
a tremendous a lot
going
of
radiative
^
ac-
electro-
to have
the f o u r
to make
corrections
if
all
are
n and p t a r g e t s .
magnitudes channels
the
of
the
total
vp, vn, vp,
attacked
by u s i n g
vn. cur-
o f sum r u l e s
order
these
of
of
all
and we
plausibility.
sum r u l e s
currents
for
fail,
that
We
nothing
the
local
Gell-Mann
ago.^
The most r e l i a b l e 72
processes
one need n o t abandon
algebra
long
the
electroproduction,
decreasing
violated;
postulated
of
s p e c t r u m and
categories
including
sacred
B SU(3)
neutrino
terms
rules.
that
is
in
o f L , R , and S f o r
three
them i n
these
most r e l i a b l y
processes,
Fubini,
is
the r e l a t i v e
emphasize
SU(3)
(2.17)
and t h e r e f o r e Someone
importance
sections
discuss
there
the muon e n e r g y
determines
these
(By
to be i n t e r p r e t e d
observables
relative
This
?)
processes.)
the b e h a v i o r
cross
1
50 GeV
13.
of e f f e c t s
What r e m a i n
This
Dp (
cases,
radiation.
to t h e s e
lepton
Fig.
such
analysis
F
Dashen,
sum r u l e
and G e l l - M a n n ,
223
is 73
that
of
derived
Adler, from
59
commutation weak
relations
current
of the time components
of the
density:
dv [ B p ( v , Q 2 )
- gp(v,q2)] = 2 (all Q 2 * 0; 0 C = 0).
°
(2.18) If c o r r e c t , the sum rule c o n v e r g e s , and we the sum for v < ^ m a x ( Q isospin
)•
obtain
Then just from CVC and an
rotation, one gets for e l e c t r o p r o d u c t i o n
an
inequality 74 v max (x Q 2')
9
0
dv [Wgp(v >Q ) + W 2 n ( v , 0
)] > 1/2.
0 It barely works e x p e r i m e n t a l l y derivation
if
max
£ 4Q
o
(2.19)
, but the
is rather i n e f f i c i e n t , a n d one should
ously worry as to w h e t h e r
(2.18)
is going
seri-
to be
true.
The sum rules (2.18) and (2.19) should be valid 2 at all Q ; the second class of sum rules, the "asymp2
totic sum rules," apply only as Q upon assuming components
something
-*.
These
about c o m m u t a t o r s
of space
of e l e c t r o m a g n e t i c and weak c u r r e n t s ,
which one now generally uses the U(6) a U(6) 75 g e n e r a t e d by the free quark model. these, ^
depend
Eq.
(2.20), looks
algebra
The first of
like the Adler sum
except that each term is m u l t i p l i e d by the Oj/(Oj+OJ):
224
for
rule
ratio
One
can
view
current
algebra
or s m a l l . of
the
this is
transverse
sonably
exists
one
(2.20)
comes
derivation but
the
if t h i s expects from
[Jy,J*] X X of
the
assumption
g i v e n by 77-79 isunreliable.
algebra
and
that
commutator
The
reliable,
a clue
correct,
Equation
z-direction).
tator
as
is
the
space-space a^
to
be
zero
consideration (with sum
rule
that
chiral
q in ->*
the
the
is
rea-
commu-
11(6) b
U(6)
80 The
next
commutator
sum
rule,
Eq.
(2.21)
involves
the
[JX,J^]:
f
(2.21) ^0-n-
It
is
nicely
experiments average (2.5)
one
neutrons
sees
ential
cross
nation
needed
The currents zation
deals
that
to
[Jx,Jy] gives
test
with and
on
3
V
6
T " Q^+oo
usually
in
the
interactions
in
nuclei,
protons.
difference nuclei
is
From
neutrino
(2.4)
and
of v a n d
v
just
combi-
the
which
differ-
(2.21).
commutator
a sum
W
because
the
sections
+
n>
observable
over
one
R
rule,
for Eq.
the
electromagnetic
(2.22),
for
the
polari-
asymmetry:^
proton
target
Oj'Op W
2
^ a / a A a J neutron
target
(2.22) 225
Here ap and a^ are cross s e c t i o n s f o r p a r a l l e l antiparallel in ( 2 . 3 ) ) .
photon-nucleon spin c o n f i g u r a t i o n s Equation
(2.22)
11(6) b 11(6) quark a l g e b r a ;
this current
the commutator [ J current.
]
i s not pure i s o v e c t o r
(related
is
contribution.
wave-functions
asymmetry r a t h e r than the neutron.
then comes out £ 20-30% over a l a r g e p o r t i o n of
the d e e p - i n e l a s t i c
continuum.
We now l e a v e these asymptotic sum r u l e s , depend only upon U(6) a U(6) equal-time of the i n t e g r a t e d d e n s i t i e s of the c u r r e n t s , rules, tions.
commutators
and turn to the l a s t category of sum s e t of assump-
Here one assumes t h a t the commutators of at l i g h t - l i k e
s e p a r a t i o n s may be
computed j u s t as in the f r e e quark model. 82-87 approach, developed by many people, beautifully
previously stated: 1. a^ •+• 0 i n a l l
3.
~
The general has been
s y n t h e s i z e d by Gell-Mann and F r i t s c h . ^
leads to the f o l l o w i n g r e s u l t s
2.
which
of the space components
based on the most s p e c u l a t i v e
current-densities
It
y
t h a t f a v o r s the proton to have the
large polarization It
,J
unfortu-
Simple models using o r d i n a r y quark Z positive;
x
But
to the 3-decay G^/Gy); Z i s an i s o s c a l a r
give
(as
again depends upon the
the z-component of an a x i a l nately
and
B . , p axial
in a d d i t i o n to those
2 -•> processes as Q
B
2 . as Q y vector 2 Seal ing-behavior as Q ->-
226
vep(v.Q2) -
Fvp(x).
VW2(V,Q2)
Fip(x) ,
etc. 4
+
(x = Q 2 / 2 M V ) ,
(2.23)
tW2p"W2n^ -T-* I t6n(Ln-Rn)
-
Q+OO
-
Bp(Lp-Rp)], (2.24)
5
tW2p+W2n^
-
" T8
(compare with
i V
3
)
n
(2
-*5)
the CVC e s t i m a t e
(2.9)).
We may now see t h a t this set of sum rules a good
indication
tion-dependences 1.
F i r s t of a l l , Eq. (2.4) and
t r u m , and in v e x p e r i m e n t s (Fig.
2. Sp;
14).
This
L > R. experi-
flat muon e n e r g y
a sharply
tends
polariza-
channels:
(2.5), that in v
rising
spec-
spectrum
to make
a
tot(vp)
>
a
tot(vn)
> ^ot^P)"
°tot(;3n)'
The A d l e r sum rule
(2.18)
(2
suggests
"26)
3"p = S n >
thus a
tot(vn)
>
a
tot^P>
>
Consequently, a
and
(2.21) s u g g e s t s
there s h o u l d be a nearly
in E'/E
sizes
in the four n e u t r i n o
This m e a n s , from ments
of the r e l a t i v e
gives
tot(vn)
>
a
°tot(vp)' °tot(™>-
-27)
(2
-28)
?
tot(vp)
* °tot^>
> °tot(^n)-
On the o t h e r h a n d , j u s t from the s c a l i n g (2.23)
(2
integrating
(2.4) and 227
(2.5)
gives
behavior
a
tot{vp)
a
tot
(vn)
in
(2.29)
•
(3.11)
0,
S
=
0,
S
=
0,
°s
=
0,
a
R
=
a
y"n1
a
L
=
CT
°R
=
a
°L
=
-yP To
=
y"p'
y n'
P'
( Q c == 0)
reactions
+
n'
2 == eo2 ^ 6 (l lM +x ^ ¡ T p ) , 2q
=
°S
v
2
I
= e 2 6 ( 11 -_
+
P'
calculate
s
vWg,
one
= "t
1
" (3.12)
simply
lets
p
-+• xp
in o
(3.11), multiplies and
by the
integrates vW2
by the p a r t o n
inclusive and sums
momentum
charge
squared,
distribution
e.,
(dx/x)f^(x),
over
= I ef J ^dxf n f. (/xy) u6
p a r t o n t y p e s i: 2 n(1 _- ^_Q p ) == vI ef ff 1
J- tJL
= ^ ^ . ( 1 ) .
(3.13)
i Similarly,
W
=
V v
the
*n
=
f. a l w a y s
functions
f o r the
determines This
V
W =2 V =
where
2
2
= v 5
p(SP)
refer
proton.
=
2
V f
n'
{
l]'
to the p a r t o n
(3
is c l e a r l y 236
for
'14)
distribution
Charge-symmetry
the p a r t o n - d i s t r i b u t i o n s
calculation
•
then
the
painfully
neutron.
naive.
I
heard
t h a t one d i s t i n g u i s h e d
that grownups theless,
shouldn't
t h e y do a l l o w
m i g h t be s a t i s f i e d . and
(3.12)
(2.18),
satisfy
(2.20),
incoherent also
To
The
them
how
cross
(2.23)
rules
sections
sum rules
Never-
(3.11) such
therefore
sections
a very
as
will
intuitive
mean.
the s u m r u l e s
we b o r r o w y e t a n o t h e r
the s u m
of p o i n t c r o s s
they might
commented
- ( 2 . 2 5 ) , and
and, in fact, g i v e
understand
namely
to see
point
has
s o r t of t h i n g .
the a p p r o p r i a t e
(2.21),
of w h a t
this
one
superpositions
satisfy
picture
do
physicist
result
in the p a r t o n
in
Frazer's
context,
lectures,
that
1
lffi(x)
=
(3 15)
v
-
o+ where
n^
is the m e a n
be f o u n d with
in the h a d r o n .
Adler's
sum
is j u s t
(number For
rule +
V which
"
Then
(
a statement
putting
+
V
minus
the G r o s s - L l e w e l l y n - S m i t h
(npl
together
(3.14)
=
1
'
number sum
(3.16) of
I^:
down)
rule
= 1.
(2.20),
we
(3.14)
+ nn,
n
P
n
+ n x . ) - (n_. + n fil
is a s t a t e m e n t
evidently
i to
get 5
V
of t y p e
of c o n s e r v a t i o n
up q u a r k s
P
which
of p a r t o n s
( 2 . 1 8 ) , we
V
of i s o s p i n
get from
=
number
of b a r y o n
the e l e c t r o p r o d u c t i o n
237
(3.17) + n^,)
conservation.
= 3, Also,
structure-functions
W 2 p and W 2 n
(other
and f^i(x))
can be d i r e c t l y
neutrino the
determined
structure-functions.
light-cone
equality
than the c o n t r i b u t i o n
relations
reached
in
These
(2.24)
(2.25)
and
of
from the
four
lead d i r e c t l y (2.25) , 1 0 3
to
with
if f^, and f^, are set to
zero: vW
= f£fVLn>
2p
+
vW
2n
l
^
= fCep
+
+
W
+ Bn(Rn)] +
Lp) -
T8^n
+
substantial
neutrino-nucleon dependences.
|.
6n(Rn)3
The k i n d e r g a r t e n require
]
W
]
W
+
(3.18)
calculations differences
cross
between
sections
In f a c t , t h e s e
differences
t h a t one m a y be s u s p i c i o u s
rules
r e a l l y will
at
whether
the s h a p e s
Such
studies
Regge
A more try
also may shed in these
sophisticated
to d e r i v e
from a f i e l d
these
so
sum
of the f. is it can
estimates
deep-inelastic
parton-model
of
processes.
approach
calculations
is to
honestly
D r e l l , L e v y , and Yan did
238
for
hadrons.
l i g h t on q u e s t i o n s
the k i n d e r g a r t e n theory.
m u s t be
such as pp -*• y + y "
processes
asymptotics
individual
polarization
usefulness, although
help to get some o r d e r of m a g n i t u d e model-dependent
clearly
all.
To go into detail s t u d y i n g at p r e s e n t of m a r g i n a l
the
and t h e i r
large
work
and sum rules
104 this,
but
in o r d e r
impose
to m a k e
it w o r k
transverse-momentum
it w a s
cutoffs
necessary
to
in v a r i o u s
vertices.
105 Others,
in p a r t i c u l a r
looked
at w h a t h a p p e n s
In a r e n o r m a l i z a b l e everything. cone
This
Chang
and
Fishbane,
when
the
cutoffs this
happens
in the
calculation
they
do
structure,
at l e a s t
they
do n o t
certain
of d i a g r a m s should
theory
infinite
correct
are
propagate
or
classes
if the
shown
freely
theory
But
in a r e n o r m a l i z a b l e as
impose black
the
needed
Other deal One
diagrams
the c o n d i t i o n s box
classes
with
the
class,
curve
opposite
17. the
The
scaling
on
lie
summing kinds
scattering
calculations partons
two-photon
that are
should
vertices.
If
this
works.
theory, d i a g r a m s
such
as
Landshoff
and
in
Polkinghorne,^
of Fig.
17 and
the p a r t o n - p r o t o n the c a l c u l a t i o n s abandon
behavior
inspired
scattering work.
the p a r t o n s
success
s u p p o s e s the 108 109
resonances.
'
the v e c t o r - d o m i n a n c e 239
just
and
phenomenologically.
by the
connection,
is b u i l t f r o m extreme
free-
then
of m o d e l s
inclusive-exclusive vl^
Compton
in the c l a s s
to m a k e
somewhat
the
light-
important.
Others, most notably consider
of
order-by-order
l i m i t of
is s u p e r r e n o r m a l i z a b l e ,
18 are j u s t
to wreck
of d i a g r a m s . T h e
in Fig. between
appears
not have
kindergarten
the
Fig.
in the
for v i r t u a l - p h o t o n
dominate
removed.
theory
as w e l l ;
in p e r t u r b a t i o n
are
field
commutators
field
have
of
the
entire At
the
models,^^
which
are
at the that
beginning
in the
dinal
^
That
very
matter with
nicely
flat
the
bigger
t h a t the
for
the
idea
fluctuation y,
virtual
and,in
the
photon.
this
photon hadronic
interacting
know
the
hypothe-
co, or w o r k s
rea-
p h o t o n we m u s t
f a c t , we can m a k e
the p r o b a b i l i t y
of m a s s m in the v i r t u a l
of
(on
size.
t h a t the
we
are
large
nucleón
does
is a p ,
For the
states,
guess
the
longitu-
curve),
to a f l u c t u a t i o n
fluctuation
sonably w e l l . ^ higher mass
than
made
argued
commutator
p a r t of the v ) ^
F o r a real
nucleón.
important
W h e n to is v e r y
supports
t h a t the
the
arguments
T h e r e we
light-cone
in the v a c u u m
and
sonable
frame
in the
long,
light-cone
section.
(0.2) (u f e r m i .
z is
converts
sis
of t h i s
approximately
di s t a n c e
by the
laboratory
distances
z ^ the
supported
a
rea-
of f i n d i n g
a
state
Just
p-domi-
as
in 2
nance And
there
should
at l e a s t be a f a c t o r
if one j u s t m u l t i p l i e s
2, dP(irT)
by a r o u g h l y
dm2p(m2)
=
add
(m
2-2 + Q )" .
constant
(3.19)
2 the such
cross
section
da/dm
for
coherent
a s t a t e w o u l d be da coh ^ dm
and f o r
large Q
production
of
(3.20)
7
2 const °coherent 240
(3.21)
Actually,
p(m
of d u a l i t y ; like
Fig.
total
Also
19.
from
total,
) should
be c o n s t a n t
i . e . , on the a v e r a g e .
coherent
states the
2
Notice
t h a t if
production
cross
(as
dm2 large
be a f i n i t e ^dinary
more
the
vector fraction
of
processes.
s -*
. coherent ^ ^
for
of
sense
look
is r i g h t ,
section
p e r h a p s % ^g-j/Otot photons
in the
It m i g h t
(3.20)
the n u c l e o n w o u l d
f o r real
only
m.
241
„
m-4
{3
2 2 )
LECTURE HADRON
FINAL
STATES
PROCESSES; While hadron
states
electroproduction, be a g r e a t deal future
there
a range
much
CONSIDERATIONS is v i r t u a l l y
or n e u t r i n o
too
These
that
of o p t i o n s
phenomena
B u t we
on how
the
k i n d of i n t e r p r e t a t i o n
the
to c o m e
data
soon and
as d a t a
appear,
theorists
mental
out
who
results
come
clearly
o u t a n d see w h a t
will
time,
be c h a r a c t e r i z e d
we are
accustomed
few e x c e p t i o n s , be e x t r e m e l y
shall
cesses.
to
that on
After
all,
it m a y
ways
the
experi-
according
the d a t a
to
could
them. data
coming than
out what
With
channels
reason,
be the m o s t
will
as
theories
be p o s s i b l e
exclusive
inclusive
242
of
statistics
For this
argumentation
were
interactions.
of g i v e n
out,
be m a d e
should
of the
in s t r o n g
difficult.
concentrate The
nature
is
delineate
completely
explains
by p o o r e r
study
from a conviction we
theory
the
might
various
suffi-
answer
to e x p l a i n
it a l s o the
near
could come
is no d e a r t h
and very
So
in the are
that way.
forward
in o u r m i n d s
For s o m e
or
there
rush
to d e t a i l e d m o d e l s . construct
this
will
try to
answers
and w h a t
there
o u t the
can
on
processes,
activity
to f i g u r e
hard.
no d a t a
processes,
of e x p e r i m e n t a l
unfamiliar
probably
DEEP-INELASTIC
in col 1 i d i n g - b e a m
on the s u b j e c t .
ciently
IN
GENERAL
at p r e s e n t
final
IV
as w e l l
may as
interesting,
deep-inelastic
be p h r a s e d
a
in as
pro-
general
terms
developed we will
(via of
have
single
a second parton
y)
the
hadrons;
annihilation
into
hadrons
like
of e s t i m a t i n g (up of
to pp
scattering single-y
energies state
is q u i t e
all
energy
energy
goes
up.
of an e m e r g i n g
In t r y i n g
as
of
p,
has
the
partial
The
over
inclusive
hadron
is n e a r l y
be
2-photon
The
one-y two
to,
purposes
the
f o r
process
energy
roughly high
constant.
center-of-mass virtual-y
the
It is
where
the
amount
not at
all
incident
very many going
momentum
thus
dependence
a tremendous
partial up
as
the
distribution
isotropic
P ^
= A(p)
+ B(p)
cos26.
to m a k e
some
analogue
with
243
to
lepton
The
waves
high
incident
wave.
collision
decay
whereas
because
releases
partial
the At
the
s
the
at very
distributed
number
in
remarkable
in o n e
includes
dominate.
energy,
reaction
beam
the
V,
e++e~
hadrons.
section.
at h i g h
a hadron-hadron
waves,
using
is n o t e x p e c t e d
will
factors)
like
is
In S e c t i o n
production;
photons
of J = 1 l o c a l l y
of e n e r g y ,
concepts
processes:
into
vanishes
cross
the
the
problem,
also
vector-mesons
logarithmic
The
hadron
probably
Weizsacher-Wi11iams
W*
channel
of
behave
this
boson
mode
beams
at t h e
col 1 i d i n g - b e a m
single-y
section
lectures.
look
dominant
cross
again
model.
intermediate
energies
using
Frazer's
begin with
the
the
possible,
in Bill
kindergarten We
as
(4.1)
ordinary
hadron
collisions,
there
is
association
should
be
distribution
or
take
options
the
extreme
two
cases,
the
the
question
with
the
with
turn.
the
truth
the
transverse-momentum
longitudinal in
of w h e t h e r
distribution.
They
actually
We
become
probably
lying
somewhere
momentum
distribution
i n-between. First of
the
of
all,
secondary
suppose hadrons
the is
associated
with
verse-momentum
distribution
in
ordinary
After
direction
as
good
all,
one
certainly
two
out
of
following
Hagedorn,
three one
momentum
distribution
like
thermodynamic
his
dN ^ dp In
any
and
the
not
be
case, mean
center-of-mass energy mean
per
number
portion conserve the (and one
to
to
the
therefore
for
fall
say
and
Then, that
the
in
it,
distributions:
is
also
The model,
is
likely
p >>
on
the
a constant,
constant.
produced
main
for
particles
appreciably
With
112
(4.2)
rapidly
center-of-mass
very
to
p^
produced
depend
particles
statistical
another,
a Boltzmann-factor
for
energy.
energy.
collisions.
transverse.
tempted
model
would
particle of
is
has
momentum
expected
are
as
trans-
p2exp(-p/T).
*
dN/dp
is
the
would total the
mean
Therefore,
increases
energy,
0.3 GeV,
in
in
order
the
proto
conclusion
for
this
spectacular
and
unprecedented
wrong):
if
^
model,
350
MeV,
.. . 113 estimates n ^
3/s,
244
(4.3)
where
the c e n t e r - o f - m a s s
3 GeV
in e a c h
particles
beam
would
nection model
a little
inclusive (defined faster
sive
e t c . , fall
sections, faster
electromagnetic power
form
component two-body joining
at low
We
then
that
the e x c l u s i v e
now
turn
TT
+
of s.
like
TT
-
the
spectrum,
at h i g h This
the m o m e n t u m
the
the
exclu-
pion
to fall
behavior
a
as a
of
model
two-body
There
off
inclusive-
B u t the
first
unlike
resonance
to the
the
p.
is
of
, p + p ~ , irAl ,
So the s t a t i s t i c a l
to the e n t i r e
distribution
imply
is e x p e c t e d
p and second
of the two.
associate dinal
The
factor
con-
statistical
at p ^ 1 /s f a l l s
a power
momentum
component
in a s m o o t h w a y
18
resonance-region
as e + e "
such
factor.
a two-component
where
would
this
(-/s/2T).
of s, if it is at all
nucleon
of
contribution
to the
- c°nst) ni d x
than
form
The
(4.2)
a p o w e r , ^ exp
connection
cross
II m a k e s
unattractive.
by p > p m a x
exclusive
an a v e r a g e
With
inclusive-exclusive
in S e c t i o n
distribution
than
in G e V .
produced.
b a s e d on the
discussed
/ ? is
(/s = 6 G e V ) ,
be
An a r g u m e n t
energy
the
forces
statistical and
appears
no
quasismooth
electroproduction,
channels
are
connected
continuum.
opposite
extreme, where
distribution
in o r d i n a r y
with
processes.
the
we
longitu-
This
option
is f a v o r e d Drell,
by m a n y m o d e l b u i l d e r s , in p a r t i c u l a r 114 Levy, and Yan, a n d C a b i b b o , P a r i s i , and
T e s t a , 11 5 w h o
suggested
it f r o m 245
parton models.
In
this
case
"limiting the
the m o m e n t u m
fragmentation,"
secondary
maximum
distribution
hadrons
possible
where
should
obey
the m e a n m o m e n t u m
is a f i n i t e
fraction
of
of
the
momentum: (4.4)
If
(4.4)
exclusive
is t r u e ,
connection
n e a r x = 1 to the processes, factor given ^
t h e n we to r e l a t e
asymptotic
in p a r t i c u l a r
F^Q
).
before
The
The
the
result
argument
large
(l-x)P
behavior
energy seen
dependence
from
tribution.
two
one
isomorphic
to the
provided
observed ^
analysis
then
in Eq.
of the m e a n m u l t i p l i c i t y ,
first
sum
rule
normalize
by
the
where
a refers
second
sum
dx f
rule
to h a d r o n
type
is w e i g h t e d
(x) = e
= 1.
246
dis-
(4 5)
-
(tt+,tt~, p, e t c . ) .
by a p o w e r
of
= f r a c t i o n of e n e r g y by h a d r o n s of t y p e
£ ea a
be
is
tVX)
a
the
as c a n
•1 n
near
(2.7).
n e a r x = 0 is c o n t r o l l e d
help
and
Frascati.^6
at
(Q2)~n,
p = 2n-l, as
sum rules w h i c h
The
exclusive
is
by d i m e n s i o n a l
with
of f ( x )
of the
f(x)
form-
if F ^ Q 2 )
that
of
pi on e l e c t r o m a g n e t i c
hadron yield
is a g a i n
inclusive-
behavior
for e l e c t r o p r o d u c t i o n ,
x = 1 dN/dx ^ The
the
the
behavior
the
[ c o n s t . ] / s , as s u g g e s t e d
perhaps
can use
The
x: carried a, (4.6)
This
second
servation, bution and
sum
rule
a n d it a p p l i e s
functions
also
follows
defined
both
to the
in S e c t i o n
to the o r d i n a r y
functions
just from energy parton
distri-
I I I , Eq.
(3.10),
inclusive
in f r a g m e n t a t i o n
con-
distribution
regions,
as d i s c u s s e d
t h a t the
behavior
by
Frazer. From
(4.5)
it is c l e a r
near x = 0 determines
n.
would
is
dare
conjecture
as p o p u l a r with
(const)
1og
in h a d r o n
physics
these
value
f(x)
of n one
s
(4.7) days, and
f o r the c o l l i d i n g
also
beams.
imply »
The
lowest
n ^
some m o d e l - b u i l d e r s
This w o u l d
The
of
combination
> f(0)
of this
> 0.
(4.8)
result with
the
inclusive2
exclusive
connection
-4 ^ Q
implies
that
if F^iQ
2 ) ^
)
2 as Q
-*-
then
f(x)
has
all
the s a m e
i n el e c t r o p r o d u c t i o n , a n d w o u l d
as v W g
properties
look
quite
similar. Supposing can we g u e s s looks all
about
scaling
several
direction go
large
will
compared
do t h e s e in r a n d o m
is c o r r e c t ,
of the
If f(x)
the m u l t i p l i c i t y
particles
energies
option
the n a t u r e
e v e n t by e v e n t ?
correct,
could
this
exists is
to 350 M e V . go?
directions. 247
and
low a n d
be e n e r g e t i c ;
particles
reaction
what as
(4.8)
i.e., Then
is
is
at 2
for s >> 1 GeV possess in
which
In p r i n c i p l e , That
it
probably
they
unfavored of pairs If n a t u r e of small
because
subenergies
p o i n t along
states
will
is
for all
approximately
s t a t e s will
likely
almost isotropically.
estimate
how m u c h
of the e n e r g y - d e p e n d e n c e
mation
statements
We n e x t d i s c u s s
logue for n e u t r i n o
Q
2
where
b a b l y ir-nucleon) a p p l y all
like
present
give
and
more
to f i n d
colli-
Our p r o b l e m
in
ana-
is to
as a f u n c t i o n
to s t a r t at large suggests
of
hadron 2 s and Q = 0 ,
t h a t the h a d r o n
in p - n u c l e o n
scattering. from
spectrum
of the p r o d u c e d
to t h a t
the c o n c e p t s
to
measurements
hadron
of the d i s t r i b u t i o n
is s i m i l a r
look
course, has a d i r e c t
processes.
vector-dominance
tribution
the
attempts
the i n c l u s i v e
It is e a s i e s t
axis
events.
and s, the s q u a r e d mass
system.
final
the c o l l i s i o n
s p e c t r u m will
electroproduction, which,of
the n a t u r e
like
of the m e a n m u l t i p l i c i t y
than
in the i n d i v i d u a l
to
But if one tries
I think
inclusive momentum
quantitative
high-
it is not too g o o d for
energies.^7
the
Therefore,
an e v e n t a c t u a l l y w o u l d
such a p a i r of j e t s ,
of the
look
number
vectors
the same a x i s .
in tt-tt s c a t t e r i n g , but w i t h
storage-ring
s t a t e , then
the m o m e n t u m
most
large.
the
(as in o r d i n a r y
oriented
study
to m a x i m i z e
in the final
situation
(subenergies)
tend to be very
is such as to p r e f e r
collisions)
the final
invariant masses
of s e c o n d a r i e s
most favorable energy
then
(and
So in t h a t r e g i o n Frazer's
248
lectures,
disprowe with
which we
assume
the r e a d e r
In p a r t i c u l a r , we shall
use
, * and
rapidity, which
in t u r n
fragmentation
per unit
rapidity
at l a r g e
fixed
a distribution
Q
2
E - ^ r r
implies and
a uniform
as w e l l .
regions,
separated
by the
the
Thus
central
particle
of density
("central
accept
these
for Q
target
of l e n g t h
in
region
schematically
have
mentation
correlation
the h y p o t h e s i s
tentatively
dN/dy
N e a r y ^ + Y / 2 we
9
in the c e n t r a l
We shall
118 familiar.
is
rapidity
of s h o r t - r a n g e
limiting
plateau").
the
notes
E + p lo
= i
the h y p o t h e s i s
of t h e s e
2
concepts
= 0 we
shown
have
in Fig.
and p r o j e c t i l e
L ^ 2-3 units,
region,
the
20. frag-
and
length
of
which
? is ^ may
log s - c o n s t a n t . expect
region
the s i z e of t h e
and
functions
As Q
the n a t u r e
to c h a n g e w i t h i n
that region
change,
a n d the p i c t u r e
the
length
projectile
of the
outside
mine
increases
of the
is as
order
in F i g .
projectile
we
distribution
region.
short-range
zero,
fragmentation
inclusive
that
from
However,
implies
no
21.
deter-
To
fragmentation
? r e g i o n , we s until overlap. O)
s/Q
keep Q
large
the p r o j e c t i l e This
and fixed
and fragmentation
probably
occurs
b)
decrease
regions
by the t i m e
that
$ 3. As e v i d e n c e
a)
and then
vW2n The (Eq.
4 vW2p
this, we m a y
f o r u £ 3; v W 2 n
longitudinal (3.4))
for
%
vW
2p
249 coherence-length
becomes
less
than
cite: f o r
w > 3.
z ^
nucleon
size.
c)
Non-Pomeron Regge t r a j e c t o r i e s contribute
strongly
vl^ has a complex
in this
certainly
region
because
s-dependence.
T h e r e f o r e when to ^ 3, the l e n g t h of the photon mentation r e g i o n s h o u l d be of the order s/Q 2 + l o g Q2 % l o g Q 2 .
frag-
of l o g s = l o g
Thus the l e n g t h of
the
photon
2
fragmentation With t h i s
should grow as l o g Q . general
argument, what can we deduce
about p a r t i c l e
distributions?
to the i n c l u s i v e
distribution
particles, region,
First function
those not i n the photon
should be very much l i k e
hadron c o l l i s i o n s .
of a l l , for
for
the
large
slow
fragmentation
those i n
hadron-
T h e r e f o r e we know something
the m u l t i p l i c i t y law. The l e n g t h of the 2 r e g i o n i s ^ Ay ^ l o g S - l o g Q = l o g to.
about
central Evidently,
n(to,Q 2 ) = C log w/3 + n(3,Q 2 ) (to ^ 3)
(4.10)
w i t h C = 1.1+.2 as e s t i m a t e d f o r hadron-hadron cesses.
In o t h e r words,
distributions for
all
to > 3.
once we know the hadron
f o r to = 3, we should roughly know them However,
this
the growth of m u l t i p l i c i t y tion
tells
or the
i n the p h o t o n - f r a g m e n t a t i o n
must plunge here i s
pro-
us n o t h i n g
distribution-funcregion.
i n t o much more guesswork,
where the g r e a t e s t
lie.
There are s e v e r a l
First
of a l l ,
f o r what
some e a r l y m u l t i p e r i p h e r a l 250
Here we
and probably
experimental
options
about
interest
will
happens. 119 calculations,
1 20 as w e l l also
as t h o s e
of D r e l l ,
are m u l t i p e r i p h e r a l
Levy,
a n d Yan
in n a t u r e ) ,
(which
gave
the
multi-
it is
simply
plicity n ^ log to. When
one
that
the m u l t i p e r i p h e r a l
to deal the
traces
with
back w h y
that happened, model
the p a r t of the
photon-fragmentation
is p e r f e c t l y
distribution
region.
doesn't
done was
quite
simply
to p u t
is u n q u e s t i o n a b l y example,
know w h a t
s ^
are
of p a r t i c l e s
and Q 2
would
large,
So w h a t
was
particles.
it w o u l d
100 G e V 2
that
getting
to do.
or two
unrealistic;
that with
the m u l t i p l i c i t y
in one
outside
But inside
region, minimum momentum-transfers and one
adequate
say,
That
for
30-40
be a f i x e d
GeV2, number
like 4 or 5. T h a t s o u n d s u n l i k e l y w h e n we k n o w t h a t f o r real p h o t o n s the m u l t i p l i c i t y is l a r g e r t h a n t h a t ? when
s %
100 GeV
gets m o r e seems
.
violent,
difficult
One
is a s k i n g
fewer
to r e j e c t n(w
t h a t as the
particles the
process
are p r o d u c e d .
It
hypothesis
= 3, Q 2 )
»- =o .
(4.11)
2
Q +co H o w e v e r , we
can c o n t e m p l a t e e i t h e r a v e r y h i g h m u l t i 2 p i i c i t y (like a p o w e r of Q ) or a low m u l t i p l i c i t y 2 like log Q , w h i c h is a b o u t as low as one s h o u l d d a r e
assume.
Very
high
by C h o u a n d Y a n g ; photon.
1 21
Their
multiplicity they
call
viewpoint
251
this
was
recently
suggested
pulverization
differs
in d e t a i l
of from
the
what
has
ment
to the c o n c e p t
embodied
been described
in
of s h o r t - r a n g e
(4.10),
that form, but
up to h e r e .
order
their multiplicity
no
in
law
commit-
rapidity is n o t
of
instead n^s
with
Having
a + 0 as u +
a ( t o )
,
(4.12)
B u t the m a i n
idea
is t h a t
the
2 multiplicity photon
becomes
photon might the as
might
grow
virtual.
decay
into
as a p o w e r of Q
when
the
F o r e x a m p l e , w h e n oj ^ 3, the a big
"fireball"
at rest
in
c e n t e r - o f - m a s s , the f i r e b a l l m u l t i p l i c i t y g o i n g „2 + n ^ 3/Q , l i k e in the s t a t i s t i c a l m o d e l f o r e e
annihilation.
One w o u l d see
a big
bump
in the
rapid-
hadrons
mainly
2 ity d i s t r i b u t i o n . pions, (the
the w i d t h
correlation
Were
the s e c o n d a r y
of the b u m p w o u l d length)
because
be £
even
2 units
of y
isotropic
of a h e a v y o b j e c t i n t o m a n y p i o n s y i e l d s a t i o n f u n c t i o n in r a p i d i t y of o r d e r 2 u n i t s
decay
distribuw i d e . 12 2
2 As
s increases
appears
at f i x e d
in t h e C h o u - Y a n g
rapidity
would suggest,
fireball
remain
photon
l a r g e Q , the model;
short-range
in the
region, with
n dictated
= C log u + 3/Q
.
There
probably would
be a c o n n e c t i o n
between
model
of e l e c t r o p r o d u c t i o n
then
probably
beams;
and
the
model
the
by
the (4.10)
(4.13) this
statistical
if p u l v e r i z a t i o n
the s t a t i s t i c a l 252
in
?
n(w,(T)
colliding
order
l o w e r e n d of
?
?
in the
dis-
on the o t h e r h a n d , t h a t
a n d be f o u n d
fragmentation
fireball
in
is
model
correct,
colliding
beams
would
be c o r r e c t ,
The other extreme tion
is
like
this was w r i t t e n
is n ( w , Q
a n d the d i s t r i b u t i o n found
2
for
long
then
the p h o t o n
low < p x > .
seem
feature,
?
fragmenta-
.
Something
Kastrup. the
total
w o u l d be m u c h In f a c t ,
momentum Some
1 23
2 Q ) = C log
co + log
physics.
is the s a m e , w i t h
by
(4.10)
in r a p i d i t y
t h a t the w h o l e
log Q
ago
from
) = C(log
in h a d r o n
to c o n t e m p l a t e
versa.
of o r d e r
down
^ C log Q 2 ,
multiplicity
as
option
low m u l t i p l i c i t y ,
If n ( 3 , Q 2 )
same
and vice
s,
the
it is
easy
distribution
of the dual
models
it w a s
proposed
1 24 to h a v e
this
and
also
1 25 by D r e l l
and Yan.
t h a t the
virtual
berry
jam and
carries
all
and
some
The
(relative
secondary
to the
subenergies.
in S e c t i o n
V,
in the
process
in the
that seed
of the
of t h a t p a r t o n ,
of the seed
it o u t , t h e n
of q.
low h a d r o n
picture
hits
of the m o m e n t u m
"bremsstrahlung" low p x
photon
knocks
the d i r e c t i o n
only
If the m o d e l
in a w a y
virtual
photon could
that
photon
We shall context
return of
rasp-
(parton)
incident hadrons
is
in
be
involves
direction) to
this
kindergarten
partons. One
feature
of t h i s
inclusive-exclusive inclusive-exclusive
picture
is a w k w a r d ;
connection. For argument states C
Q
it is
real p h o t o n s , that
(l-x)1"2^) n e a r x = 1. the e x c u l s i v e
The a(t) process
is the R e g g e - p o l e
the
(4.14) dominating
yN •*• ttN, ttA, e t c . , 253
the
and
experimentally linear in
fact,
is
not
Now we
argument. least
the
is %
dependence
data.
at
126
can
Regge
the
inconsistent
at very
same
Therefore,
on x n e a r
make
We
0.
photon
guess
that
the
exchanges.
gets
a
x = 1,
which,
photoproduction
virtual
to, w o u l d
large
„
endpoint
with
the
one
and
exclusive still
repeat
the
processes,
be d o m i n a t e d
by
So,
S^(t)-2
f ( Q
2)s
{ 4 > 1 5 )
2 where
also
one w o u l d
guess
(from
polology)
Making
the
inclusive-exclusive
argument
(which
may
not be
to
right)
f(Q2)
{[§ ^ and
in o r d e r
inclusive
to
get
f(Q
) ^ Q
.
that
the
linear
term
limit
and
does
connected
the
to
intercept While
on
pitfalls
leading momentum
too
limit
with
to
the
one
of
in
this
in
spectrum
pp
of
must
in
which
some
is
in
the
of be
trajectory
with an
the
of
the
example
incluof
the
diffraction-dis-
has
approaches 254
It w o u l d
it d o e s n ' t
collisions
power
mean
channels.
there
where
vanishes
over.
troubles
idea
It m a y
a higher
takes
connection,
big.
in d a / d x
exclusive
subject
phenomenon,
proton
looks
(4.16)
scale,
the
the
hiding
sociation
scale
contribution
in
sive-exclusive
This
something
(l-x), which
low
(4.16)
contribution
the
).
2
have
scale
in
F^(Q
backwards
(l-x),
a finite
distribution
2
leads
f ^
2
an a
work.
The
inclusive
nonvanishing
constant
as x
(4.14) w o u l d exclusive
1.
The
imply
cross
inclusive-exclusive
connection
a Regge-intercept
sections
a = 1 / 2 , or the _9 as s . B u t , as
falling 127
shown
in T r i l l i n g ' s
sociation
contribution
Therefore,
one
responsible
the
comes
phenomena the
on
initial
Multibody
leading
as x +
about
because
p r o d u c t i on
impact-parameter
nated
by the v e r y
parameter.
They
A t this discuss
a possible
for w h y
the
in x for x %
rapidity-space x %
are
there
has
to h a v e x <
•
00
Another the
appearance.
and
for
a
so
there
of
HQ
single
done is
and
V
free
with
hope
E
pM
particle
old-fashioned
that
might
-
the
work
non-
again
in
limit. feature
conceptual
simplifies,
its
conveniently
perturbation
the
in
as
of
the
high-energy
picture
of
the
already
discussed
265
scattering in
limit
is
process
Section
I I I .
that
At very tions
high energies
in a h a d r o n
passage works,
through the
stages. state
into
ideally
of
internal
down, while
a target does
first
its
rate
not.
process
may
its
time
If this
into
of the
of c o n s t i t u e n t
f o r the
coordinates
of the p a r t o n s .
through
target and
pass
old-fashioned
the
3
initial
partons,
by a g o o d
partons
of picture
be b r o k e n
is the d e c o m p o s i t i o n
configuration
fluctua-
described
function the
slows
scattering
The
the
wave Secondly,
interact.
In
135 quantum electrodynamics and
in s t r o n g
interactions
simple."'®''
In the t h i r d
the e x c i t e d
state
back
together
part
is n o t so
and
photons
be
the
interaction,
partons
has
to be
physical
put
particles.
or one
bare
Cheng
a n d Wu d i s c o v e r e d
of t h e p a r t o n s charged bare
this
3-step
in q u a n t u m
or p h o t o n
adequately
described
with
That
photon,
with
is
partons
merely
pick
photons
interact
stages
1 and 3, o n e
always
constructs
theory. interaction
Coulomb
up a
inter-
Coulomb
n o t at a l l .
wave
by use of o l d - f a s h i o n e d 266
the
one
corrections
the d o m i n a n t
target
and
partons.
by p e r t u r b a t i o n
that
picture
electrodynamics
is a l m o s t
the
phase,
and after
to
after
in t e r m s o f c o n s t i t u e n t
being
action;
state,
t h e final
electron
electron
simple,
it is c o n j e c t u r e d
electrodynamics
can be d e s c r i b e d
bare
is
easy.
Leptons
A physical
interaction
of e m e r g i n g
into
In q u a n t u m works.
this
functions
perturbation
For before theory;
the
rules
for doing
In s t r o n g the
important
phase tile
are q u i t e
interactions, interaction
space where and t a r g e t
region
this
the
Feynman
occurs
parton
overlap,
simple.
conjectures
in the r e g i o n s
distributions
essentially
in r a p i d i t y , w h e r e
1 3 fi
there
can
of
in the
that of
projec-
central
be e x c h a n g e
or
1 37 scattering quantum tant;
of p a r t o n s .
electrodynamics
So
collisions,
either
strong
simple
states
a c t of s c a t t e r i n g
parton Now
process.
deep-inelastic
reactions,
+ -
*
and depict what
happens
In Fig.
26
partons
constituting
ordinary
momentum
inelastic happens
is s h o w n
so
that
to
the
the
what happens
three
partons
phase
incident
as one
the is a change
examples
in a of
hadrons,
typical
in the
decomposed
(via y e x c h a n g e ) ,
space).
collision
or
-»-hadrons,
e"p ->• e" + pp -»• h a d r o n s
ordinary
much.
We t a k e
-*• y
for
in f a c t , d o e s n ' t
this w i t h
deep-inelastic
in
impor-
configuations , there
very
let us c o n t r a s t
e e
having
which,
configuration
is
electrodynamics
is t h a t , parton
also
that
multiperipheral
the p i c t u r e
in q u a n t u m
into
found
a generalized
in s u m m a r y ,
interactions,
initial
a n d Wu
this m e c h a n i s m
it is e s s e n t i a l l y
mechanism.
the
Cheng
Now we
267
in p h a s e
points
for
space.
the
particles
(in
define
deep-
in w h i c h
state
(5.2)
formed
a
something
violent
immediately
after
the
interaction
has
been
lated
removed
in p h a s e
hadronic pA.
there
f r o m all
space.
partons)
Because
o f the
process
is r a r e
and
it i n v o l v e s
more
high-pA
tude.
The
the
has
photon-exchange
in the
entary
it l e a d s
collision
a very
of p a r t o n s ;
process
the
the ampli-
(5.2),
is the
after
distributions
a
is a 2 - b o d y
r e a c t ions
immediately
which
amplitude)
t- or s - c h a n n e l
to the p a r t o n
large
(1) s u c h
the s m a l l e r
F o r the
(for
a process,
small
number
iso-
has a
we a s s u m e
elementary
collision.
a n d is
parton
in s u c h
involved
which
in g e n e r a l
struck
a small
simplest
process;
means
pA
parton
neighbors
process,
(i.e.,
partons
parton-parton
its
large
an e l e m e n t a r y
least one
This
that
we call
(2)
is at
elem-
the
shown
in
Fig.
27. For t h i s m u c h discussed needs parton Eq.
are
the
only
the
in
in the
to h a v e V.)
(3.11),
takes
the
how
incident
leptons,
We t h e n
into
this
we
to c o m p u t e .
ignore
the m a s s
we
state
268
have
of
hereafter
term
The
all
partons
section, to
in o r d e r
to u n d e r s t a n d
existing
by
in H m a y
distribution Now
One
as g i v e n
the p o i n t c r o s s
section.
recipe
function
partons.
momentum
description,
is the
hadron,
and
fold
cross
the. i n t e r m e d i a t e
there
distribution
zero mass;
deep-inelastic
complete
for
(Incidentally,
of h a d r o n s ,
into
III
inclusive
momentum
taken
be put as
in S e c t i o n
(3.10).
masses
o f the p r o c e s s
get to what
immediately
after
the c o l l i s i o n
hadrons.
The
assumption made
guess which
They
IV,
are e i g e n s t a t e ?
going
to c h a n g e many
If the
interactions
t h e r e will direction probable partons space
partons
be no
the
configuration
figuration
the
survive.
27
isolated
parton.
low s u b e n e r g i e s , t h e n relative
will
lines
to
So
that parton
in
in
some
k i n d of
the of
con-
equilibrium
B u t we
configuration
of
configuration
a multiparton
28.
of
momentum
into
Fig.
most
be a n u m b e r
the
reach
the
the
Thus
evolves
are
and
partons.
as s h o w n
still
to the
have
final
configuration.
For o r d i n a r y problem.
The
hadron
initial
collisions
state
is s o m e
partons,
and after a mundane
the
distribution
same
decide what
hadrons
by F e y n m a n ^ 0 1 out
parton
the p o s i t i o n s
which may
from
do n o t
is m o v i n g .
to e v o l v e
along
at the
in Fig.
generated
parton
the
rapidity
with
parton
distribution,
px
in
to
Interactions
the s i n g l e only
real
the o r i g i n
isolated
isolated
partons n o t H.
involve
concentrated
original
hadron
from
large
in s p a c e
connecting
to go
of H q ,
applied
the c o n f i g u r a t i o n s
create
an
isolated
of
is r e l a t e d
correlation
but here
Clearly, the
state
we make
of s h o r t - r a n g e
in S e c t i o n
level.
to the final
is t h a t
is on the a v e r a g e
the very
distribution
emerge.
the d o g m a
hadron
or
One as
to the
same of
less has
to
pronounced
distribution
similar
269
is the
col 1ision, m o r e
of p a r t o n s
come out;
there
coming i parton
distribution.
We now
inelastic
processes:
jet comes
into
assume
the
the p a r t o n
equilibrium
and
will
be s i m i l a r
to the
same
reasons
in the m u n d a n e
Such
as
cosmic-ray the
parton
deep-inelastic
spectacular;
o n e will
frame
the
A picture is s h o w n
in Fig.
in the d e e p - i n e l a s t i c
j e t of h a d r o n s .
will
hadron
partons the
emerging
total
body
the f a c t
is a c t u a l l y
electron g,
bremsstrahlung
the
forward
emerges That for
from
incident
by the
be
the
the d i r e c t i o n
then
scattering.
270
momentum the by
there struck
measure the
two-
reconstructed nature
from
of
quantum
go o u t
electron
of
an
along goes
out
bremsstrahlung
of the s c a t t e r e d
same m u l t i - c o r e
pp
scattering
hadrons
incident
and more
in
multiple-core
familiar
the
very
the
two
could
know the
In d e e p - i n e l a s t i c
direction,
along
is the pp
This
from a proton,all
be
in
29 for
If o n e
could
quite
will
in a d d i t i o n ,
doesn't
partons.
the
an e v e n t
of e a c h j e t ,
t h a t one
electrodynamics.
But
collision
each
n o t is c o n t r i b u t e d
pA.
and angle
participating
phenomenon
high
for
collision;
jets contributed
with
parton-parton
despite the
energy
of the
that does
an o r d i n a r y
in
distribution
cores,
of s u c h
participates
be two
hadron
events
Only
of m o m e n t u m
deep-
processes.
scattering.
fraction
the
distribution
hadronic
a fraction
for
distribution
have m u l t i p l e
language.
laboratory
same
structure
as
electron.
described
In o r d e r borrow
again
to go f u r t h e r from
of s h o r t - r a n g e If t h a t
such
hadrons
parent
in t h a t
should
the
step
(and t h e r e f o r e similar
the
(of the
hadron
probability
coming
x of the
quite
well
ing-beam IV.
because
experiments, (cf.
points
are
particle any
space.
core
limiting
a "central exchange
= ^G
i a
the
frag-
plateau."
having
w h i c h we
271
that a
fraction is (5.3)
the
already
fairly
function
its p r o p e r t i e s
(4.5)) ,
the
(in d x )
becomes
pin d o w n
about
of t y p e
(x). rest
is
between
a hadron
i and
Then
parton
in e a c h
the p a r t o n
we can
by a r g u i n g
For e x a m p l e
of
far
the
equilibrium
e.g.,
of
of
parton, we can write
of t y p e
O n c e we go t h i s predictable
in the p h a s e
dP. of f i n d i n g 1a
dPia
nature
combined with
px
and parent
four m o m e n t u m
the
distribution
small
from a parton
on
such
and
hadrons
the d i s t r i b u t i o n
high-pA
parton!)
notion
the
high-pA
of a n y
processes,
the
the
of
phase
the
we
rapidity-space.
r e s t of the
elsewhere
hadron)
the
process
then
only
is to a s s u m e
neglecting
observed
into
is l a r g e w h e n
to o r d i n a r y
mentation Then,
the
subenergy
or p a r t o n
final
pA
depend
All
region
particle
in the
four-momentum,
parton.
far a w a y ;
the
of h i g h
something,
lectures
in the e v o l u t i o n
parton
of c o m p a r a b l e
Frazer's
correlations
is t r u e
isolated
Bill
and compute
did
G(x)
in
collid-
in
Section
1
I a
^ G
by p a r t o n
( x ) = R ,
(5.4)
II g ll
the m e a n m u l t i p l i c i t y created
i a
of h a d r o n s
i, a n d
(cf.
in the j e t or
core
4.6)
1 I a a
Furthermore, G(x) where
probably
near
the e n d p o i n t
1 * p < 3.
inclusive-exclusive Section
dx G. 1 a (x) = 1 .
0
IV a b o v e
This
connection
Eq.
(5.5)
goes
like
(l-x)P,
follows
from
the
(2.7)
(4.5), which
discussed
tells
us
in
that
the
2 power
p should
be r e l a t e d
to
the
the e l a s t i c tttt e l e c t r o m a g n e t i c once one zation
has
argument
limiting wants
it f r o m
(or e n v i r o n m e n t a l of the
it) s a y s
the
fall-off
form factor.
the c o l l i d i n g
fragmentation
to call
high-Q
beams,
And
the
factori-
independence,
parton,
same
or w h a t e v e r
distribution
found
last point,
by F e y n m a n . Now
simple, tions
this
the being
1 38
been
and and
independently
)
cross-section convolutions
f or G w i t h
has
one
functions
G.1 a a p p l y to e l e c t r o p r o d u c t i o n , pp s c a t t e r i n g , many other processes. (This l i n e of a r g u m e n t , especially
of
point
calculations of
cross
are
probability sections.
pitifully
distribuFor
e+e~
* Y
-»- h a d r o n s ,
(da/dfi) c m Let
for
us a s s u m e
one
starts
producing charged
out with
the c r o s s
a parton-anti-parton
partons 272
have
section pair.
the q u a n t u m
numbers
of q u a r k s .
The
cross
section
for producing
a
y-pair
is (da)
(1 + c o s 2 e ) .
- Ifi
(5.6)
cm and for quark
p a i r s we m u l t i p l y
(5.6)
of the
2 e., l
by G. ( x ) d x / x la
charge
then m u l t i p l y
x = p/pmav max
- 2p//s,
antiparton)
types.
finding
a hadron
tP &
r
Because in n u m e r i c a l
cm
and finally The
(1
= ^
the
a is
+
estimates
we
That
is no d o u b t
tions.
parton
however, type
should
process
are
to p r o c e s s .
of w h a t
function
which
kind
(e.g.,
G(x)
is d o n e .
section
independent
about
K/tt or p/-RR). only
independent
of
in s u c h
That means in any
choices:
These on
the
process.
ratios
a hadron,
273
assump-
charge-
of p r o d u c i n g
two
i,
(5.8)
shall
We t a k e
of
that
H e r e a f t e r , we
to c o n s i d e r
for
(2p//s).(5.7)
to d e p e n d
variation
it is.
(and •
G(x).
predicted
be l i t t l e
with
parton
the r e s t o f o u r
and are o t h e r w i s e
the p r o b a b i l i t y
pendent one
%
iGia
is
assume
than
or p a r t i c l e - r a t i o s
ratios,
only
e
.
F u r t h e r m o r e , we do n o t w o r r y
ratios
There
better
^
(5.5)
I G1a(x) a
cross
square
simply:
c o s 2 e )
sum r u l e
the
sum over
inclusive
of type
by
always
from discuss
inde-
there
is
calculation
only
2(l-x) G(x)
=
(5.9) 6.84
The
6.84
makes
the c o r r e c t factor. The
/G(x)dx
threshold
Some
comes
in an o r d i n a r y , y's
virtually
and
the
At
terms
convert
processes
all
generic
inclusive
C), w h e r e
A,
f(x)
Kogut,
We w e n t d o w n
asked which
elementary
parton-parton The
generic
processes
are
shown
in F i g .
electrodynamics
high-energy
processes tests
A + B either are
pA
deepin
in
(3.10)
a list
C +
of
anything
a lepton
18 s u c h
(e or
generic
by one
and
processes
(i.e.,
could
contribute
Yukawa-like
elementary
32.
processes. works, we
(a) a n d To know
(b) are
pure
the e x t e n t
that
that
these
In fact, the p u r p o s e
of e l e c t r o d y n a m i c s
274
for
them
defined
l i s t one
exist.
Both
the s a m e
I then made
There
2-body
hadrons
picture
deep-inelastic
quantum-electrodynamic
elementary
and
interactions)
to t h e m .
quantum
to h a v e
and G ( x )
the
31.
dominance,
to c a l c u l a t e
B, a n d C a r e
processes.
2-body
vector
form
collisions.
processes
or a h a d r o n .
30 a n d
collision.
have a g e n e r a l
functions Berman,
photon,
via
and a way
(5.3).
y),
to p's
has
pion
the p r o c e s s y + y
is p r e s u m e d
and
(AB
in F i g s .
not d e e p - i n e l a s t i c
p o i n t we
of the
for a dipole
shown
as TTTT, irp, or pp
this
inelastic
are from
pp c o l l i s i o n
distribution
= 1, a n d n e a r x = 1 G ( x ) behavior
results
background
vW2(x).
is j u s t
to
of test
that these any way.
elementary To
processes
the e x t e n t
that
of d e e p - i n e l a s t i c
process
is c e r t a i n
(d), w h i c h also
applies
exist.
tionable While
The
and
timate
involves
a free
has b e e n
to e x i s t .
Compton
It f o l l o w s
process
exchange
exist,
called
(e) is m o r e
of a h a d r o n i c
hadronic
into
is a
that
scattering,
the q u e s t i o n
virtual
in
electroproduction,
to p r o t o n - p r o t o n
the v e r t i c e s
exchanging
not m o d i f i e d
the p a r t o n m o d e l
description (c)
are
of
quesparton.
whether
parton
question
should
is
legi-
by B r o d s k y
and
1 39 Roy.
They
parton-model processes
argue game
that even within
it d o e s n ' t w o r k .
(f) a n d
(g) a r e
involve
a deep-inelastic
Perhaps
this
be z e r o
because
the
is an
field
theory.
the
existence
hadronic
coupling.
deny
to c a l c u l a t e cesses changes
with
(f) a n d
considering
because
of 3 h a d r o n i c
infinite
of t h i s
partons.
vertex which
could
renormalization
kind of strong
We do n o t s p e n d m u c h these
latter
B u t we
if t h e s e
elementary
two
processes
effort
elementary
are
in well
elementary
can n o r m a l i z e
processes
the
they
Boo ts t r a p p e r s , 1 i kewi s e, mi g h t
(g).
in y i e l d
vertex
of
rules
Elementary
speculative
unrenormalized
of s o m e
the
the
proexpected
present
involving
trying
by
a J = 1
g l u o n , as s h o w n in F i g . 33. T h u s the g l u o n - e x c h a n g e c r o s s s e c t i o n c o u l d be ^ 10^ the p h o t o n e x c h a n g e , a n d 2 deep-inelastic
gluon
photoproduction ^
s c a t t e r i ng. 275
10
of
Compton
We n o w (A + B Many
consider
C + anything);
of the e n t r i e s
discuss
o n l y a few
SLy
h:
by B r o d s k y , think
of
listed
using
is on
the e l e c t r o n
and
is
process
and T e r a z a w a . 1 4 0
C 1.
we
of
photon
vector-dominance
can an
in
the
is m a i n l y
The estimated
the e d g e
in the
discussed
One
scattering
of p ° , w , a n d .
process
AB
in T a b l e
self-explanatory,
is a s t o r a g e - r i n g
Kinoshita,
beam, which
of h i g h
are
are
from a Weiszacher-Wi11iams
this
when
they
processes
examples:
This
superposition for
18 g e n e r i c
it as d e e p - i n e l a s t i c
electron other
the
of b e i n g
a
rate
observable
deep-inelastic
region
pA.
YY ->• h :
This
ment;
two W e i s z a c h e r - W i 1 1 i a m s
beams
can make
hadrons
pair at high
(e).
the G ( x )
hadrons
coming
expected,
even
It a l s o
for
collisions,
in the
very
into
via e l e m e n t a r y tells
to be m a r g i n a l l y
experiments, electron
pA
again
out.
photons
by a n n i h i l a t i n g
antiparton Then
col 1 i d i n g - b e a m
is a n o t h e r
experiincident
a
parton-
process
the d i s t r i b u t i o n
turns
small
o u t , as m i g h t
for
be
col 1 i d i n g - b e a m
high-energy
occasionally
of
electron-
discussed
at
SLAC
1 41 and
in
Novosibirsk.
Ah inelastic is
h:
This
is the
hadron distribution
electroproduction.
independent
longitudinal
of p a r t o n
momentum
type,
To
the
extent
in
that
the
scaled
hadron
distribution
should
be
276
deepG(x)
i n d e p e n d e n t of to and Q 2 . bution,
including
That a l s o means the
particle-ratios,
s h o u l d be a l m o s t
the same as found i n the col 1 i d i n g - b e a m
experiments.
There c o u l d , of c o u r s e , be some d i f f e r e n c e from d i f f e r e n t
ratios
cases.
the p a r t o n s
But i f
distri-
of p a r t o n t y p e s
coming
i n the two
have quark quantum numbers,
the p r o t o n l i k e quark p 1 has a c h a r g e twice as as n '
and A ' ;
the c r o s s
the c h a r g e and t h u s p ' over the o t h e r s butions
sections
m e n t a t i o n of p ' yh ->-y: scattering.
go as the s q u a r e
production
is
by a f a c t o r of 4.
should therefore quarks
This
a priori
Most of the
process
leading
frag-
Compton-
from the p a r t o n s
the same way as the e l e c t r o n Coulomb s c a t t e r s electroproduction.
The o n l y d i f f e r e n c e
s t r u c t u r e of the e l e m e n t a r y p r o c e s s e s which i n f a c t are v e r y s i m i l a r . lastic
Compton s c a t t e r i n g
the same k i n e m a t i c a l partons,
distri-
hadrons.
is deep-inelastic
The y - r a y s c a t t e r s
lies
in
in in
the
(e) and
(c),
The r a t i o of
ine-
to e l e c t r o p r o d u c t i o n
conditions
of
favored
be c o n t r o l l e d by the
into
great
is,
for
under
quark-like
102
dg (y p-»y) _ ( E - E ' ) 2 da(ep-e) EE' yh -> h:
• YY YY-
hh ^ h
+
hadrons;
W
at
electro-
hadrons.
Mul-
q + gluon
exists.
e+e~
pp
+
mechanism,
qq a n n i h i l a t i o n
by £
of h i g h
10
pA;
scattering.
if g l u o n -32
hh
process;
if qq -»• y
into +
exists,
Coulomb 4
if y + q
to
qq a n n i h i l a t i o n
pp ->- h a d r o n
10
2
Multiply
gluon
similar
+ hadrons;
hadrons;
distri-
from above
and e + e ~
production
pp
scattering,
electroproduction.
distribution
hh -»• I
y+y~.
of
distribution
tiply
B e t h e - H e i tl er
10 t ^ hilation
cm into
284
exchange 2
d e e p - i nel asti c Multiply
by £
exists.
2 f o r s >> m w ; W.
qq
anni-
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B9,
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FIGURE 1
2
Electromagnetic
p r o c e s s e s w h i c h test
electrodynamics
at small
Electromagnetic
(a) and weak
the decay 3
CAPTIONS
distances. (b) m e c h a n i s m s
contribution
to the K^ -
difference.
4
Kummer-Segre mechanism
5
Crude e s t i m a t e s of l e p t o n - l e p t o n
for the weak
a n t i l e p t o n cross s e c t i o n s 6
Doubly peripheral production
7
for
K^ -»-
S e c o n d - o r d e r weak mass
quantum
in l e p t o n - l e p t o n via
and
lepton-
if s t h e n o n s
m e c h a n i s m for
Sthenon production
interaction.
exist.
sthenon
collisions.
1epton-anti1epton
annihilation.
8
Sthenon p r o d u c t i o n by n e u t r i n o s
if sthenon =
hadron. 9
2 The region of v-Q electroproduction
10
Structure-function inelastic
11 12 13
space w h e r e W^ and W2 for from protons
w'.
S c h e m a t i c plot of an i n c l u s i v e m o m e n t u m Expected transverse-momentum
Expected distribution
Total
deep-
scattering.
vWg versus
of m u o n s 15
measured
vk^ for e l e c t r o n - p r o t o n
muons from 100 GeV v-N 14
has been
in v and
v
spectrum
s p e c t r u m of
50-GeV
interactions. of longitudinal
fraction
processes.
v-N c r o s s - s e c t i o n d a t a ( f r o m 296
Ref.
90).
16.
D i s t r i b u t i o n of m u o n i n e l a s t i c i t y interactions
17.
(Ref.
90).
I m p o r t a n t c l a s s o f d i a g r a m s i m p l i e d by model calculations Ref.
18.
v-N
in
( L a n d s h o f f and
parton-
Polkinghorne,
107).
D i a g r a m s p r e s u m e d u n i m p o r t a n t in n a i v e mftdel
parton-
calculations. p
19.
Conjectured mass-spectral
f u n c t i o n p(m
c o h e r e n t l y p r o d u c e d s t a t e s in
) for
deep-inelastic
electroproduction. 20.
Schematic rapidity distribution p r o d u c t i o n at e x t r e m e l y high
21.
(w ^ S / Q 22.
2
>>
photo-
energies.
Schematic rapidity distribution electroproduction
in
in
2
high-Q
at e x t r e m e l y h i g h
energies
1).
Feynman diagram for electroproduction
of m u o n
pai r s . 23.
Vector dominant picture for p°
electroproduction.
24.
A v a i l a b l e p A - y p h a s e s p a c e at v a r i o u s
25.
90° c.s.m. momentum distribution
of
expected for 400-GeV incident protons various 26.
e+-e~ annihilation,
27.
hadrons under
hypotheses.
P h a s e p o i n t s of i n i t i a l - s t a t e
p-p
machines.
partons for
(b) e"-p s c a t t e r i n g ,
(a) (c)
scattering.
P h a s e p o i n t s of p a r t o n s i m m e d i a t e l y a f t e r a deep-inelastic
collision. 297
28.
Phase
points
inelastic 29.
of p a r t o n s
Multiple-core
Estimated E
31.
structure
hadron
cm
deep-
of s e c o n d a r y
hadron-hadron for e + e ~
spectra
hadrons
collision. annihilation;
= 5 GeV.
Estimated E
32.
cm
time a f t e r a
collision.
in a d e e p - i n e l a s t i c 30.
some
= 8
hadron
spectrum
for e + e ~
annihilation;
GeV.
Catalogue
of e l e m e n t a r y
deep-inelastic
scattering
processes. 33.
Diagrams
34.
Kindergarten inelastic
for g l u o n
exchange
parton-model
hadron-hadron
and
production.
diagram
scattering
for via
deepphoton
exchange. 35.
Quark
parton-model
hadron-hadron
estimate
collisions.
298
of W p r o d u c t i o n
in
e-(M") e + (M + ) (b)
(a)
(d)
(c)
Hr (Z,A)
(f)
(e)
299
I
"o
301
O
CD CT O
co O
CM? E C5 O
302
w en
303
304
o ro
L O co (0/A90) 7b
305
o C\J
00
CD Ö
LO Ö
sfr Ö
ro Ö
(XI Ö
306
— ö
1.0
2.0
3.0
4.0
5.0
6.0
7.0
8.0
9.0 10.0 Fig.
n
dN dp
Fig.
308
12
Fig.
Fig.
309
13
14
i
r
X FREON 1963/64 /
( Normalised ) P R O P A N E 1967
/
/
/
/
/
/
/
/
/
/
/
/
/
i x/ /
/
A
J L 4 8 12 NEUTRINO ENERGY E(GeV) L
O
Fig. 310
15
_|
evi
O
o evi
o sj-
(M
o
o ro
o
o
co
o o
o
00
o CD
o
o o
o
o
o
o
o
cu
CD
o co
00
(D
311
o
CVJ
o
X P
Fig.
17
q
q.
p
p
X Fig.
18
>(m2)
m' Fig.
312
19
P
dN , dy
-Y/2
photon \ fragmentation^
central region
/ target /fragmentation
(Q2=0)
\ Y/2 y
L ~ 2
log
s-constant
Fig.
L ~ 2
20
s
-Y/2 1
/ target /fragmentation y
virtual \ photon \ fragmentation \ (Q2 large)
central region
y
L ~ 2
log ai - c o n s t a n t
Fig.
21
Fig.
22
313
log Q 2 + c o n s t a n t
Fig.
23
Pi(GeV)
Fig.
314
24
cm2
Secondary Particle Distributions For 0 c . m .= 9O° pp Collision At s = 8 0 0 GeV 2
IO - 3 3
hadron background upper limit to hadron distribution for gluon model
IO -35 0 01
hadrons from qq Coulomb scattering
* CD
photons from q q — yy
b "O IO -37 T3 •o *Q.
leptons from qq—•-SS
IO - 3 9
IQ-41
i
1 L
0
10 P T (GeV/c) Fig.
315
25
(a)
(b) -•
M» I I
(c)
-•—••
» I
•
Fig.
316
26
(a)
T
•
(b)
-•
•
•
• •
(c)
T
• >i
Fig.
317
27
(a)
T
PT
(b)
• • »i
(c)
T
• •
»-«H
Fig.
318
h i g h p, jet
f o r w a r d jet
h i g h p^ jet
Fig.
319
29
cm2
e+e~ Colliding Beams: ,/s = 5 GeV background from y + y — h a d r o n s
10-33
hadrons from e+e~ inihilation via one y
_
e from y + e — y + e IO"34
-
10-35
_
from 7 + e — y + e
i IO"36
-
0
0.5
1.0
1.5
2.0
P T (GeV/c)
Fig.
320
30
2.5
3.0
e + e ~ Colliding
Beams: ^ = 8
background f r o m
GeV
y+7—hadrons
hadrons f r o m e + e ~ annihilation via one y e from y +
e—~y+e
y from y + e — - y + e
F i g . 31
321
photon Jepton (b)
(a)
hadronic parton (c)
(e)
(d)
(f)
Fig.
322
3 2
(Q)
323
LECTURE I DIFFRACTION I.
Introduction In t h i s
t i c and
tween
lecture
inelastic
peripheral
I shall
behavior
the q u a n t u m
these
processes
cross
sections
numbers
have
are
of the
they
likely
of s t r o n g
interactions
forward
p a r t of e l a s t i c
because
of the
statistical systems
large
p p , K p , u p , p p , np.
aspects
of the d i f f r a c t i v e
emphasis
I propose
on s o m e
on to d i f f r a c t i v e cleons only
and
processes
bosons.
involving
From
studied
and
it
has
easily-accessible inelastic was
some
and
of b o t h
I shall
by
investi-
experiments. general
p a r t of e l a s t i c results
dif-
proposed
recent
scattering
then
to
incident
consider
single-nucleon 326
or
ever-increasing
to d i s c u s s
dissociation
incident
energies.
Although
recent
incident feature
is e a s i l y
of
in r e l a t i v e l y
lecture
their
with
its m o r e d e t a i l e d
In this
with
that
a dominant
dissociation
in 1961,^
has o n l y c o m e
the
be-
particle
available,
in e x p e r i m e n t s for
sharply
the d i f f r a c t i v e
statistics
significance
Good and Walker
high
scattering
f r a c t i o n , or d i f f r a c t i o n
gation
to b e c o m e
p o i n t of v i e w ,
elas-
F u r t h e r m o r e , s i nee
or n o t a t all
at very
by
incident
products.
slowly
of
relationship
the c h a r a c t e r i s t i c
momentum,
investigated
a class
characterized
a n d by a c l o s e
vary
an e x p e r i m e n t a l
consider
processes
a n d t h o s e of the o u t g o i n g
been
PROCESSES
move nu-
here
targets.
11.
Elastic The
elastic
Diffraction
single most scattering
by the o p t i c a l forward
precisely measured
is the
theorem
elastic
to the
s,t have
Total
their
cross
been measured
imaginary
usual
related
p a r t of
the
on h y d r o g e n
precisions
results
(1)
definitions.
i n c i d e n t TT4 , K 1
for
The
section,
= Im A ( t = 0 , s ) ,
sections
up to 60 G e V / c w i t h percent.
cross
in
amplitude, atQt(s)
where,
total
parameter
above
targets
have
a n d p,p f o r
of a f r a c t i o n
8 GeV/c
are
momenta of a
shown
in
the
2 curves
of F i g .
curves
are:
(1) appear
The
The
appears
Between
to u n d e r g o
ir±p r e m a i n i n g (2) nearly
The
a further
the
(pp, K + p ) with
systems
below
least
the pp
still and
are m u c h
25 G e V / c .
section
appears
general
and
(pp, K~p, i^p) of
more Be-
The
and their
327
all
the K~p
sections
the a b s e n c e
others.
these
errors.
the K + p c r o s s
0.8-1.0 mb.
correlated two
up to a t
decrease,
t h a n the o t h e r s
between
in the f i r s t
energy
K + p cross
pp and
by a b o u t
presumably
with
of
sections
25 a n d 60 G e V / c o n l y
25 and 60 G e V / c
in b e h a v i o r
properties
constant within
constant
to r i s e
basic
p p , K ~ p , a n d ir±p c r o s s
to be d e c r e a s i n g
25 G e V / c .
tween
1.
difference is
resonances
presence
in
the
(3)
The
a(pp),
AA(K),
though
there
decrease that of
AA(TR) is
some
is a t
exhibit
not only
ir+ a n d
seem
higher
from
a simple
accounted
the
change
Regge
P',
understand
most
the actual
energy
the
highest
of
16 G e V / c 50 G e V / c .
invent
then
have
the
for
Thus
been
all
expected
an
if a n y ,
data
have
assumes
Pomeron,
(2),
(3),
them
a percent
but
CT(K)
been 3 but
is, in which
fact, keeps
between
to
not
near
have
between
be n e e d e d
is c o r r e c t .
can
(4)
It
scheme
5%
ex-
dependence,
here.
it by
plots
plus
one
of m o d e l s
energy
will
328
if o n e
(p,A2),
esthetic
increases
exchange
dependence
of A(IR) a n d
A number
into
h^
p,
energy
the
and
this
the
the C h e w - F r a u t s c h i
1 for
to w i t h i n
Far m o r e
model,
that
sections
involving
features
for
to go
constant and
violation
invariance.
cross
Thus
dependence
intend to
for
(P',u>)
the
I do
a£0t(K+p)
and
energies.
non-trivial
a
suggests
features
P , P ' ( f ) , to,
1/2
for
to a c c o u n t
not
would
sections.
proposed
which
behavior
K~
models
well
p> A ^
degeneracy
, al-
This
for
a(pp)-
model.
roughly
u>
^
ACT(TT) m a y
SU(3)
and
than
poles
cross
of
K+
simple
Regge
total
1 //p-j
=
that
no e v i d e n c e
to o b e y
tt~, b u t
reasonably
intercepts for
seem
past,
basic
the
slowly.
as
AA(p)
Theorem.
a t 60 GeV
In t h e
of
roughly
In g e n e r a l , t h e u n e x p e c t e d
the data
the
differences
indication
present
Pomeranchuk
(4)
of
behave
a little more
there
the
cross-section
2
16
and and
establish
Information
at
higher other
energies, as well reactions
exchange,
as
s u c h as c h a r g e
e t c . , will
be
tion.
To
exhibits
angular
in s o m e d e t a i l
the
scattering
high-statistics The general
cross
studying hypercharge
the
elastic-
the f o w a r d
possible,
obtained
experiment
of t h e d i f f r a c t i o n
direc-
Fig. 2
for K + p
sections
at 5 G e V / c
wire-chamber
behavior
near
precision
the d i f f e r e n t i a l
K~p e l a s t i c
exchange,
distribution
illustrate
of
required.
L e t us now c o n s i d e r scattering
the r e s u l t s
in a
done
at
peaks
v a r i o u s i n c i d e n t p a r t i c l e s is s h o w n in F i g . 5 ± f r o m an a r t i c l e by H a r a r i . T h e it , K and
and recent 4 CERN.
for
3 taken p exhibit
2 structure K+,
near
already
t = -0.6
distinctive
cross-section peaks.
with
increasing
To m a k e forward the
both
constant
diffraction
in
the o t h e r
p and
total-
K+p
diffracshrink
systems
width.
quantitative,
peak
the
smooth
the pp a n d
energy, whereas
this more
of t h e i r
show completely
Furthermore,
relatively
, whereas
by v i r t u e
behavior,
tion
remain
(GeV/c)
we r e p r e s e n t
in a l i m i t e d
t range
the
with
parameterization
where
by the o p t i c a l
(Jf>o
theorem
= °-051
329
'lot"
+
a2]-
O)
wi th
For a s i n g l e a(0)
Regge-pole
+ a ' t , the v a l u e
exchange
with
trajectory
of b is e x p e c t e d
to t a k e
a(t)=
the
form, b(s) At sufficiently be e x p e c t e d
= bQ
high
+ 2a' in
(s)
energy, where
.
(4)
the P o m e r o n
to d o m i n a t e , d i r e c t c o m p a r i s o n
experimentally-measured indicate whether o n e of the m o s t
b with
indeed one striking
the f o r m
(4)
has a m o v i n g
predictions
of
might the
would (a 1
pole
of the
f
0),
Regge
theory. Present
experimental
at c o n v e n t i o n a l
accelerators
recent measurements Rings
to 500 and
experimental
shown
setup
in Fig. 4.
The
results
Fig.
evident
It is q u i t e
compatible with
Eq.
b(s) -»• c o n s t a n t ^ In v i e w the v a l u e
12
(4).
energy
laboratory
energy).^
ISR m e a s u r e m e n t s
results, are t h a t the d a t a
Indeed,
is and
shown are
it a p p e a r s
ISR
in
not
that
as s
of the f a c t t h a t b e t w e e n in a m a n n e r 330
and
Storage
of the S e r p u k h o v
(GeV/c)-2
of b i n c r e a s e s
60 GeV
center-of-mass
f o r the
as o t h e r
measurements
Intersecting
1 0 0 0 GeV
e x p e r i m e n t s , as well 5.
up to a b o u t
a t the C E R N
(ISR) at 30 a n d 45 GeV
(corresponding The
d a t a c o n s i s t of
20 a n d
60
GeV
which agrees
with
(4) w i t h a ' ^ 0 . 5 ask w h e t h e r Serpukhov is
some
da dt
and
to n o t e
model
meterization
where
and t h e
the S e r p u k h o v
geometrical
(da} v ;
that several
experiments,
e-KB e
K is a c o n s t a n t ,
for
3 is the v e l o c i t y
2
P? £ J-
to j u s t i f y
For
of the a g r e e m e n t shows the
(5).
between
pp c r o s s
in on the
tot
c
'oes
it o u t . GeV/c
y
have
been
More
K62t
a para-
, , '
fitted9
momentum,
one
respect obtains
(6)
recently
Leader
theoretical
arguments
the
the data,
quality Fig. 6
b(s)/[atQt(s otQt
total
simple cross
been
form
sensible
whereas
the S e r p u k h o v
and
forward
region.
probably
=
ISR d a t a
where put
(6)
applies
section.
t h a t the d a t a
for 0 . 0 5
331
)]
has a l s o
it s e e m s
be n o t e d
This
e
illustrate
t h a t the
slightly,
It s h o u l d
a
-s4m2),
some
section
supposition
v a r
it even
using
proton with
(6) a n d
in the l i m i t of c o n s t a n t CT
ago,
Krisch^
t h i s model
To
a p l o t of the r a t i o
total
years
(da, Mt'o
= Kf32 = K ( s
have given
the f o r m
In f a c t ,
pp s c a t t e r i n g
of e i t h e r
w h e r e M is the p r o t o n m a s s . o P e n n i n g ton
between
P ^ is the t r a n s v e r s e
to the c e n t e r of m a s s .
and
occurs
to
form
dt o
b(s)
change
be t e m p t e d
ISR r a n g e .
suggested
of the
=
, one m i g h t
significant
energies
interesting
before
(GeV/c)~
to
accounts
divide
below
|t| = 0 . 5 cover
Since
(GeV/c)2,
a much for
25
the
more slight
discontinuity values Fig. to
between
between
form
10 a n d
6 t h a t all
1000 GeV/c of E q .
attempt
non-Serpukhov 25 G e V / c .
and
It is c l e a r
of the d a t a on b(s)
are
in r e a s o n a b l e
(6).
Eq.
(6),
from
any
I may
two c o n d i t i o n s
observed
in K + p
and As
Eq.
s -»• °°
b(s) •*• 0
as
s
and
(6) d o e s
system
hence
with
associated this
pointed
do n o t
However, cross
energy,
R
of
b-(s)
5
essentially
20 G e V / c .
In s i m p l e of
a constant
terms, o-(s) boson
it is
natural
by
Davier
behavior
is
illuminate
ratio
IT IT p 20
a t 3.6 G e V / c . A( 1 236) a n d
In a d d i t i o n
p(765)
highly-peripheral of r e l a t i v e l y reaction
ir+p
production
to the
production, process
low m a s s .
there
show
is
produces
Chew-Low
TT+ir+n a l s o
of l o w - m a s s
which
well-known
plots
strong
(nir+) s t a t e s . 340
another (pit0) for
states
the
peripheral It s h o u l d
be
emphasized
immediately
that these enhancements
far too l a r g e and too b r o a d to be e x p l a i n e d of A + ( 1 2 3 6 ) .
production p r e t them the
in t e r m s of d i f f r a c t i v e
incident
baryon
sequently decay
into e x c i t e d
into n u c l é o n
We c a n e m p h a s i z e processes (1)
It is m o s t natural
by l o o k i n g
several
body final
state.
to
interof sub-
pion.
features
At h i g h e n e r g i e s d i f f r a c t i v e a dominating
the
dissociation
of
at some a p p r o p r i a t e
can b e c o m e
by
states which
plus
are
characteristic
these figures:
dissociation of a
three-
C o n s i d e r , for e x a m p l e , the
tion K + n ->- K + pir" at 12 G e V / c w h o s e D a l i t z
reac-
p l o t is
21 shown
in Fig. 14.
T h e pir
to 1.7 G e V , a r i s i n g is the d o m i n a t i n g (2) seen
The
from d i s s o c i a t i o n
f e a t u r e of the
of the
sort
weaker
t h a n , for e x a m p l e , A { 1 2 3 6 )
produc-
is e a s i l y seen? ? in Fig. 15 taken from
w o r k of B o e s e b e c k mass spectra
1.1 neutron,
of the
in Fig. 13b and Fig. 14 have a m u c h
This
from
reaction.
l o w - m a s s Nir e n h a n c e m e n t s
energy dependence tion.
enhancement
et a l . ,
for the
which
s h o w s the
the
(Nir)
reactions
ir+p -»• tt(Ntt) J _ 2/2 IR + p ->• TT(NTT)
at 8 and 16 (3)
J
=
1 / 2
GeV/c.
T h e NIT m a s s
tive d i s s o c i a t i o n
spectra
produced
in t h r e e - b o d y 341
final
in
diffrac-
states
contain
considerable 1470
MeV,
contributions
the
lowest mass
lished
by
of
spectrum
the
from
phase-shift
Fig.
15.
(4)
The
duced
with
falls
from
masses
I = 1/2
well
below
N* r e s o n a n c e
analysis.
Indeed,
about
below
MeV,
can
enhancements
substantial
1400
under
cross
as
discussion
section
only
estabhalf
be
seen
are
pro-
in
non-
23 charge -exchange that
in
the
nir+ a n d
the
pir" a n d This
reactions pir° m a s s
result
i s , of
course,
final
by
17,
We
have
only
enhancements,
expected
have
so f a r
at
for
Meson
considered
a
only
dissociation
is
leads
high
energies
states
such
as:
incident
shows
ir~TT+n,
depopulated
at
for
16
low
the masses.
purely
process.
dissociation.
Fig.
spectra
in f a c t ,
process
Fig.
ir~p -»- Tr~ir°p a n d
being,
(5)
of
Thus
mr"
diffractive
tant
processes.
and
also to
ir"p
A p
TT±P
+ A^p -
K±p
-V Q ± p
K±p
-v L ± p -> [ i r K * ( 1 4 2 0 ) ] ± p .
example, 10-GeV
K~
baryon an
impor-
production
->- [ u p ( 7 6 5 ) ] ~ p ,
(13a)
[7^(1 2 6 0 ) ] ^ ,
(13b)
-> [ T T K * ( 8 9 0 ) ] ± p ,
(13c)
shows
the
(13d)
[KTTTT] s p e c t r a
in r e a c t i o n s
of
the
type
produced (13c),
24 (13d). region MeV
Large-mass 1100-1500
(L).
At
the
MeV same
enhancements (Q)
and
time 342
in
there
are
the is
present
region no
in
the
1700-1900
significant
enhancement (6)
As
proceeds the
in c h a r g e in the
via c r o s s
exchange.
baryon sections
incident momentum.
section
(reaction
case, meson
only weakly dependent
Fig.
13c)
dissociation
the Q +
18 s h o w s
as a f u n c t i o n
of
on
cross K+
incident
25 momentum. ground
To
subtraction
the c r o s s
small
same
both
contributions (7)
a t the
J u s t as
a multiperipheral processes
under
ing c r o s s
section
diffractive
rather tion all
diagram
study
dissociation
than a stable
the d i f f r a c t i v e
in e x c l u s i v e
in F i g .
vanish.
inclusive one
the
reac-
can
and
b into
be a
resultto
particles
resonance
For e x a m p l e ,
in
reac-
c = pion, d = K*(890).
processes
which
have
pion exchange vertex,
For t h e d i f f r a c t i v e 343
draw
exclusive
19 c o r r e s p o n d s
of p a r t i c l e
at the n o n - d i f f r a c t i v e
a.2 = p i o n % 0.
section
consideration.
The diagram
object).
reactions,
region.
significant
to d e s c r i b e
(one of w h i c h c a n a c t u a l l y
(13b), a = proton,
process
under
inter-
presumably
experiments,
here.
shown
MeV
:
make
Q,
background
n o t a l t2 o6g e t h e r
energies
counter
of the
of the c r o s s
in the c a s e of the
studied with
c and d
Such
1250-1400
P 1 , to e x c h a n g e
and
back-
for various mass
dependence
it d o e s
of
definition
is t r u e f o r A-| p r o d u c t i o n
Pomeron
tions
problems
removal.
in the
the m o m e n t u m
is r e l a t i v e l y w e a k , The
thorny
are quoted
background
in a n y c a s e
Although
the
and precise
sections
vals without is
avoid
been
is the that
vertex
For observed
dominant is,
one
at has
a-| = Pomeron = 1 leading
to cross section of the
form da *
By d u a l i t y ,
27
from reaction
•
(14)
the extremely m a r k e d low-mass (14) c o r r e s p o n d s
production of r e s o n a n c e s .
to the
diffractive
The arguments
previously
given for the decrease toward zero of all 2 contributions
in a given M
interval
peaking
background
imply
that any low-mass structure with a cross
again
section
00 tending to a finite limit as s is r e s o n a n t . Thus the A-j , A g , Q, L, as well as the low-mass baryon
e n h a n c e m e n t s , are m o s t probably r e s o n a n t
structures. 2 6 It is, h o w e v e r , important to note that the dM /M
d e p e n d e n c e of Eq. (14) emphasizes 2
low m a s s e s
3
more than the dM /M
d e p e n d e n c e of Eq. (11)
priate to the inclusive r e a c t i o n s .
Thus
tively-produced
in the
r e s o n a n c e s observed
reactions with t h r e e - b o d y final
in m a s s .
exclusive very
substantially
It seems plausible
this may account for the high populations MeV
appro-
diffrac-
states are
likely, unless quite n a r r o w , to be shifted downward
far
in the mass spectra of Fig.
that
below
1400
15.
The results of an actual m u l t i p e r i p h e r a l culation for the Q + structure produced at an
calincident
m o m e n t u m of 12.7 GeV/c are shown as the solid
curve
in Fig. 20 and are compared with experimental
data
obtained
by the Rochester Group. 344
This
comparison
indicates as
qualitative
expected
structure
if o n e
by t h e
type model. Q+
to t h e
incoherent plitudes 180 and lent
21
of
on
220 M e V ,
the other
several
which
1260
agreement,
resonant
of a
hand
Regge-
shows
groups
in t e r m s
of
Breit-Wigner
and
two
1400 MeV OQ
respectively.
supports
structures
to d e s c r i b e
predictions
super-position
discussed
notion
attempts
at m a s s e s
and
riot q u a n t i t a t i v e
smoother
Fig.
data
but
for
theoretically
that
have
cross
limiting
fit
the am-
with widths
The
experimentally
of
a
fit the
is Q
of
excel-
the
diffractive sections
in
2 fixed
M
intervals
be r e - e m p h a s i z e d to
be
Fig.
shifted 21.
ments,
in
I have
to
of
be an
dissociation
producing
Fig.
as
the
that
in t h e f i t
Q in
well
19
to
the
a Ktttt
a pion
a.
fact
are
likely
shown
by
experi-
spectrum
states
Indeed,
emitted
elastic
345
reactions
again
to
C = pion,
lower
scattering
If o n e w r i t e s
diffrac-
one-pion-
referring
at the
there
between
and
and
discussion
that
in e x c l u s i v e
final
diffractive
in t h e
connection
= p i o n , a-j = P o m e r o n
particle
however,
inclusive
yield
alluded
seen
three-body
a2
incident
of
intimate
19, with
undergoes
resonance masses values
already
processes.
see
low
It m u s t ,
mass.
exchange
can
the
example, might
diagram
appears tive
toward
upward
(8) of t h e
that
resonant.
Observations
for
shifted
are
Fig. we
vertex with
a standard
the one-
pion-exchange
cross
section
•rr-scattering
a diffractive
Eq.
(da/dt)t_g
(2) w i t h
obtains
an o v e r a l l
final
state which
which
behaves
in a s e n s e , in
alternative Ntt
and
the
duality
to
resonant other
part
words,
the
for
energies,
should
tering, This
such
intimate
the
the
outgoing the
the
that
but
and
Pignotti)
relates
we
region
Pomeron
actually to
of
the
see
nonIn
when tt-tt
low
nonresonant 2
an
tttt , Kir, o r
scattering.
isospin
can
Thus,
observed
dissociation,
the
S-wave
-> Q+ p
tt-tt
sub-
scat-
contribution.
be f u r t h e r
illustrated
usual
K * ° ( 8 9 0 ) Tr+ p •+ K + t t " t t + p .
this
process
leading
ir+p s c a t t e r i n g ,
in
contain
relation
consider
of T r - e x c h a n g e
and
to
and
diagram.
is d u a l
tttt, Ktt , Ntt
diffractive
energy
is
by C h e w
scattering,
one
example
K+p
If w e
as
of d i f f r a c t i v e
assumption
example,
as
of
by
three-body
dissociation.
suggested
the
given
energy,
the
processes
dissociation
of
for
the
form
of
dissociation
nonresonant
extended,
by
(as
diffractive
the
a one-pion-exchange
Harari-Freund
exchange that
diffractive
description via
of
in f o r
independent
three-body
scattering
Applying
term
section
is a l s o
diffractive
exclusive
puts
independent
cross
like
and
K+ cos
the in 2
to
K*°(890)
Jackson the
a.
from
K* From 346
angle
rest
the
point
plus
view
diffractive
a between
frame
of
is
a diffractive
incoming
distributed point
of
v i e w , one forms a Q system of overall 1 + with a K* and a ir+ in an S - w a v e .
spin-parity Again,
since
the S - w a v e and the it+ carry no h e l i c i t y , the K* m u s t have the zero
helicity 2
m u s t e x h i b i t the cos couched
in the J a c k s o n frame and a distribution.
Although
in d i f f e r e n t l a n g u a g e s , these two
tations are in a fundamental
way
of r e s o n a n c e s
interpre-
equivalent.
F u r t h e r m o r e , this e q u i v a l e n c e the p r o p e r t i e s
hence
s t r o n g l y ' 1imits
produced
diffractively.
Thus the L system a p p e a r s to d e c a y via K*(1 420)tt (S-wave)
but not via K*(890)ir (P-wave).
of these m o d e s fits well
into K*(1 420)
The
former
production
by o n e - p i o n e x c h a n g e , but the latter does not fit into K*(890) There
production
via this
exchange.
is an i m p o r t a n t c o r o l l a r y
to this
nection between d i f f r a c t i v e d i s s o c i a t i o n pion-exchange.
and
conone-
In studies of tttt or Kir scattering
via o n e - p i o n - e x c h a n g e
amplitudes, resonances
produced
by d i f f r a c t i v e d i s s o c i a t i o n m a k e an essential bution to the n o n - r e s o n a n t scattering.
part of the tttt or Ktt
In p a r t i c u l a r , it is i n c o r r e c t to
tract out their c o n t r i b u t i o n s or as
contri-
as spurious
sub-
reflections
background. (9)
The s p i n - p a r i t y of the A 1
have been i d e n t i f i e d
and of the Q
as 1 + and of the A^ and L as pc on
2" (with m u c h less c e r t a i n t y ) .
'
s i s t e n t with the p (765) it , K * ( 8 9 0 ) t 7 , 347
T h e s e are f {1 260)tt ,
con-
K*(1420)IT K*(890), butions
S-wave
decay
f(1260) are
all
and to
modes
expected
K*(1420)
if t h e
p(765),
decay-angular-distri-
be c o m p a t i b l e
with
production
via
one-pi on-exchange. Needless pretend
to
to
say,
discuss
tive
dissociation.
more
complete
that
the
should
stress
on
the
to
pushed
sive
be
reactions;
dissociation are
already
be v e r y
into known
helpful
of m e s o n s
where
(d)
(a)
diffracpermit
state
of
to
be
be
at
high
resonant
spectra
factors
particularly
the
in
understanding
no
phase-shift
and
-by are to
excluof
baryon
amplitudes
analysis,
the
data
in
analysis
resonant
phase-shift
are,
supported
the m a s s
I
diffractive
diffractively to
a
nevertheless,
process
a detailed
348
not
In c o n c l u s i o n ,
by d y n a m i c a l
NTT, w h e r e from
hoped,
expected
(c)
not
present
seems
does
about
do
points:
low m a s s e s , and
is
produced
results;
toward
It
a major
also
distorted
space
therein.
grounds,
experimental
summary known
of our
major
structures
is
and
becoming
identification
likely be
is
theoretical
this
flavor
these
*
(b)
that
Time
is r e f l e c t e d
dissociation energy;
all
above
discussion.
general
knowledge
the
would
dissociation are
available.
REFERENCES 1.
M.L. Good
and W . D . W a l k e r ,
Phys.
Rev.
1_20, 1854
(1960). 2.
S.P. Denisov
3.
V. B a r g e r 93
et a l . , to be
and
R.J.N.
published.
P h i l l i p s , Nucl . P h y s .
(1 971 ).,
4.
C. B a g l i n
5.
H. H a r a r i ,
6.
M. H o l d e r
et a l . , to be
Letters work
published.
SLAC-PUB-837
(1970).
et a l . , P h y s .
Letters
(ISR d a t a ) ;
G.G. 2 7 4
30JL>
are g i v e n
Benznogikh (1969).
A.D.
(Gordon
and
et a l . ,
in t h e C o m p i l a t i o n
Krisch, Lectures
Vol. 9B, W.E.
Brittin
Breach,
(1970).
and A . O . York,
and M. P e n n i n g t o n ,
of experimental
pp s c a t t e r i n g ,
and
the d a t a
below
25 GeV
Hauptman
at
editors
Preprint data
calculations
(1971).
on pp
of b(s)
were carried
a n d H. H a r a r i ,
(1971).
Phys.
M a n y of the s a m e
in an e a r l i e r
D. M o r r i s o n , Conference
Barut,
and
for
on by
J.
LBL.
D. C l i n e , N u c l . 11.
Physics,
1967).
The collection
porated
other
UCRL-20000NN
9.
239
to
Benary,
E. L e a d e r
M. D a v i e r
Phys.
in T h e o r e t i c a l
New
(1971)
of 0.
8.
10.
35B, 355
References
L. P r i c e a n d G. A l e x a n d e r , 7.
B32,
Phys.
paper
are
incorand
( 1 970).
Report, XVth
on H i g h - E n e r g y 349
ideas
35B,
by V. B a r g e r
B23., 227
Rapporteur
Letters
Physics,
International
Kiev
(1970).
12.
E.W. A n d e r s o n et al., Phys. Rev. Lett. 2J5, 699 (1970); also paper submitted to XVth tional
Interna-
C o n f e r e n c e on H i g h - E n e r g y P h y s i c s ,
Kiev
(1970). 13.
J.V. Allaby et a l . , paper submitted to XVth International Kiev
14.
C o n f e r e n c e on High-Energy
Physics,
(1970).
E.W. A n d e r s o n et al., Phys. Rev. Lett. 1_6, 855 (1966).
15.
P.D. Ting and H.J. Y e s i a n , Phys. Lett. 35j[, 321 (1971).
See also J.M. Wang and L.L.
Phys. Rev. Lett. 26^, 1 287 Abarbanel
Wang,
( 1 971 ) and
H.D.I.
et al., Phys. Rev. Lett. 26., 937
(1971). 16.
H. H a r a r i , Phys. Rev. Lett. 20, 1395
(1968);
P.G.O. F r e u n d , Phys. Rev. Lett. 20, 235 17.
This
is e q u i v a l e n t to saying
Pomeron coupling rather cavalier
is small
(1968).
that the tri pie-
or zero.
about replacing
I have been
in Eq.
(12a)
cip ( t ) by its value at t = 0 rather than grating over t.
inte-
The latter p r o c e d u r e , if oip(t)
has a finite slope, leads to a result which still
increases with s, not as in s as
by Eq.
(12a) but rather as in in
15 for
details.
s.
18.
L. Van H o v e , Nucl. Phys. B9, 331
19.
A. Bialas et al., Nucl. Phys. j m ,
350
implied
See Ref.
(1969). 479
(1 969).
20.
J.M. M a c N a u g h t o n ,
Ph.D. T h e s i s ,
UCRL-20178
(1971). 21.
A.
F i r e s t o n e , G. G o l d h a b e r ,
Phys. 22.
Rev.
Lett.
K. B o e s e b e c k
26, 1460
a n d D.
Lissauer,
(1971).
et a l . , Nucl . P h y s .
B28,
381
(1971). 23.
A a c h e n - B e r l i n - B o n n - C E R N - C r a c o w - H e i d e l berg Collaboration, national Kiev
24.
paper
Conference
submitted
to X V t h
on H i g h - E n e r g y
J. B a r t s c h ,
quoted
Nucl.
in R e f .
H.H.
Bingham
tion
using
to
Physics,
(1970). Phys.
B8, 9 (1968).
Aachen-Berlin-CERN-London-Vienna
25.
Inter-
Collaboration
11.
et a l .
World
(CERN-Brussels
Data Tape),
International
and Related
Also
Conference
paper
Collaborasubmitted
on M e s o n
Electromagnetic
Resonances
Phenomena,
Bologna
(1971). 26.
G. A s c o l i
et al . , P h y s .
Rev.
Lett.
26^, 929
(1971). 27.
28.
G.F.
Chew
and A.
1078
(1968).
M.S.
Farber
Pignotti,
et a l . , P h y s .
Phys. Rev.
Rev.
Lett.
L e t t . 2J),
22., 1394
(1969). 29.
A.
Firestone, The
Experimental C. B a l t a y sity
Meson
and A . H .
P r e s s , New
Q Region
of
KTTTT M a s s ,
Spectroscopy, Rosenfeld
York, 351
1970),
edited
(Columbia p.
229.
in by Univer-
G. A s c o l i (1970); Illinois
et a l . , P h y s .
Rev. Lett. £ 5 ,
D.V. Brockway, Thesis, Report C00-1195-197
352
962
University
(1970).
of
FIGURE
1.
2.
3.
High-energy (Réf.
2)
da/dt
for
(Réf.
4)
Behavior
elastic
total-cross-section
K±p
of
elastic
da/dt
Experimental
5.
pp d i f f r a c t i o n tion
of
s.
Plot
of
b(s)/g2atot
function 7.
8.
of
slope
(Ref.
of
tion
momentum.
(see
Experimentally
at
TT±P
p,
and
5
pp,
of
5 GeV/c.
ISR
pp
experiment.(Ref.
parameter
b(s)
as
for
pp
scattering
text
for definition)
determined
t from
K*
(Ref.
10)
"Jo"
elastic
(see
10.
Missing-mass
spectra
for
K ~ p ->•
(Ref.
12.
The
Multiperapheral in
a
plots
GeV/c.
-»• p M M ,
(elastic)
curve
diagram
for
a
func-
as data
(Ref.
TT~P
a
12)
•+• T T ' M M ,
12)
solid
inclusive
Chew-Low at 3.6
pp
da/dt(1.69)/da/dt
12)
tion 13.
K'MM.
(Ref.
as
scattering
f o r n ~ p -»• TT~MM.
K".
6)
func-
text)
spectra
p and
a
as
Missing-mass
Plot of
pp
5)
9.
11.
GeV/c.
momentum.
R
function
±
at
6)
P l o t of of
K
(Réf.
setup
measurements.
scattering
for
scattering.
4.
6.
CAPTIONS
for
is
a fit
for
incident
to T "
diffractive
data.
dissocia-
reaction. the
(Ref.
353
reactions
20)
IR+p ->- TT+TT°P
14.
Dal i t z 12
15.
GeV/c
Isospin in
the
GeV/c 16.
plot
(Ref. 1/2
reaction
ir+p
NTT m a s s
Cross
(Ref.
19.
20.
21.
of
Fit
of
(Ref. two
position
of
at
produced
at
combinations
the
for
form
K+p
diagram
f i t
by
8 and
16
of
various
GeV/c (KTTTT)N
as
K" (Ref.
function
24).
of
25). for
3-body to
10
K"p
->• Q + p
(Ref.
exclusive
Mul t i p e r a p h e r a l GeV/c
spectra
(Ntt)-,^
produced
momentum
in
NTT m a s s
for
spectra
Multiperipheral ciation
-»• K + i r ~ p
23).
section
incident
K+n
22).
spectra
Kir IT m a s s
reaction
21). 3/2
interactions 18.
the
and
(Ref.
charge 17.
for
K+p
diffractive
disso-
reaction. ->• K * ° i r + p
at
12.7
28). Breit-Wigner high-energy
354
amplitudes Q+
data
to
(Ref.
a
super-
29).
~i
i
i
i
i
!
i
r
52 50 4e
46
•
• • 4
44
pp
42
40
0
«o 0
o OtyO o
C O o i/ o o pp.
jS E n . b*
9
°oí>boo; IO i o co CD—. Q-+J
-—. E to r-^ 1— O •— 00 V£> • U O • 4•a • o a i stO c o u ce. o •i— Q II P - — • 4"a +-> 1 00 1 o c to +-> 3 tn •M 4-> 3 > o (O •O a ) £ + s : •—• i— i . •r- i -—• IO (/> ( : T J »1 +-> CO •(-> io 10 en •r— + " a 0) s: IO 3 + o E -l-> r—
(A>0 ,(VA»0)/Q1"] «rt»lp/»,p
362
4— c s IO sTJ 1 -a c (0 -C ai SIO
I
10 ío J2
"O 1 O •m a i -C +-> + J •r— 4- í . O m 4— a> s- o IO \ 3 > e r a> to t a i +-> o o to IO 4-> 01 IO r— XI IO IO
"a IO SE
Oì CVJ 1 1— CSI O) 1— o> c IO
— ,
to 4 - CS a> O " O -—. > S- 0) s rZ O Q--—
>1 Î. o +J
363
Fig.
364
11
Mass H
ir ¿-.ftf M* AM > Fig.
12
365
'mm
to 2(3/A99)
366
o CM
( A
9
9
)
( _ -a
l
+ >i
367
)
z
n
368
369
Fig.
17
1.20 < M ( K ir T T )
«>
O s 2.0 jO E 1.0
Si
2.0
(b)
1.0
1.45 < M (K7T7T) < 1.50 2.0
2.0
1.0
1.0
(f )
2-0'
6.0
10.0
Cross
14.0
i i i i i i t » 2.0 6.0 10.0 14.0 16.0 P,Lab. GeV/c k 16.0
section
for
Fig.
371
K+p 18
Q+p
CL
A 1 i i 3 / 2
Pl1tudes
in t e r m s
gives
s
-|/2'
l / 2 ' ^3/2'
find
anc
^5/2
the
could
of a
interthe
back-
values: I
Solution
280 MeV
260
MeV
II
0.27 t h a t b o t h of t h e s e
i m p l y an
of 4 - 5 m b .
The
be
MeV
noting
D3/2'
5b.
2040
It is p e r h a p s w o r t h
GeV/c.
*
1 8 9 0 MeV
0.22
1.21
1.89
5a and
plus
used
and
Parametrization
the f o l l o w i n g
nant p a r a m e t r i z a t i o n s
They
and
which
GeV/c
as w a s
0.52
1.21
of a B r e i t - W i g n e r
Elasticity
section
P
a behavior
Width
to 1 . 8 9
between
in Fig.
Solution
cross
0.52
(we h a v e o m i t t e d
shown
Mass
of
energy-
in 1 9 7 0 . ^
between
as r e s o n a n c e - l i k e .
wave
ground
as m u c h d a t a
solution
have
an
twice
published
a r e
which
et al .
from
fo.r the
)
is o n e
going
solutions
w a v e s
9
phase-
the e x i s t e n c e
recently made
solutions
diagrams
for
of Kato
have
analysis
Wagner.
(Z^).^
(i) T h e A n a l y s i s
independent
first group
strongest claims
isospin-1
and
are v e r y e x p e r i e n c e d
analysts, while
has m a d e
of L o v e l a c e
( H I )
inelastic
This would
381
reso-
resonance
require
a
bump
of t h a t s i z e o v e r MeV/c
an
incident momentum
in the KNn s y s t e m .
s u c h an
The Analysis
Ayed
et al.
phase-shift
of A y e d
have made
analysis
their work
from
t h a n t h a t of
solutions
(IA, IB) w i t h
that differ
only
an a t t r a c t i v e
repulsive
P-^ w a v e .
shifts
of the odd (P^
S-JI c o m i n g and
only
slightly
of
energy
terms
waves
are as
The
seems
at
in F i g .
only 6.
term
low
very
unlikely phase then
Solutions
for
solid the
IA lines
^2/2.
form ,
(3a)
1
1 +
(3b)
~ o > (lb q ) n including
parameters
follows:
382
two
large
of the
The
on
solution
up to 500 M e V / c ,
of the
considered
c.m. m o m e n t u m . )
obtain
S-wave
dependence
6 = 2anqn 1 -
They
and o n e
II
GeV/c.
it is b a s e d
S - w a v e and a v e r y
a Breit-Wigner
background
old,
et al.
Solution
shown
to 2 . 5
a repulsive
important
are
show fits with
f o r all
hint
energy-independent
in), and we consider
IB, w h i c h
plus
no
al.
threshold
Kato
(II) w i t h
in v i e w
an
et
is o v e r a y e a r
less d a t a
energy
3a s h o w s
500
effect.
(ii)
Since
Fig.
r a n g e of
OIL.
of t h e
(q is
the
corresponding
Solution Mass
Ayed
et al.
energy
have
also
E^ d e f i n e d
dT dE
k
1899
MeV
520
397
MeV
0.16
0.20
examined
T E
k+1 k+1
"
T
^
E
w h e r e T is t h e a m p l i t u d e partial
wave.
theoretical
the
s p e e d at
the
as
1 2
k
IB
1932
Width El a s t i c i ty
Solution
IA
k
+
+
k
relationship dT dE
, (4)
k-1
corresponding
For a B r e i t - W i g n e r
speed
k-1
1 2
to a g i v e n
amplitude
the
is
2x
r(e
2
(5)
+ 1)
where
£ - (E, Thus
the
maximum
speed value
follows of 2 x / r
the c r o s s - s e c t i o n The 7a
(black
dependent
results points
a Breit-Wigner and w i t h
Breit-Wigner for the
P^
are f r o m
curve with a
wave
are
shown
Breit-Wigner;
are f r o m
a similar
fit with
no B r e i t - W i g n e r ;
vertical
bars are
analysis).
in
the a b o v e m e n t i o n e d
the P 3 / 2
shift
It is e m i n e n t l y
clear from
Fig. energy-
open
the e n e r g y - i n d e p e n d e n t
383
as
curves.
fit w i t h
from
r
the s a m e w i d t h
circles
and
the
phaseFig. 7
K + p data
t h a t the variation
do
not s u g g e s t
of a m p l i t u d e s
of r e s o n a n t
behavior.
energy variation
which
the
is u s u a l l y
If t h e r e
is no f a s t e r
than
background.
Quoting
Ayed
"Considering
the
and
the s l o p e
of the
we m u s t c o n c l u d e in K + p e l a s t i c
'speeds'
that
there
Wagner
made
high waves and high
"acceptable" P
a possible
from
Kiev
work, of a Z*
K+p
Solution
III
Fig.
9 and do n o t f a v o r
This
is p a r t i c u l a r l y
solutions
resonance
true
a
available four
is the o n l y
S.^,
in Fig. 8. to
Plots are
Of
display of
shown
the in
interpretation.
for Solution
384
the
II, III) w h o s e shown
KN
between
they o b t a i n e d
amplitude.
f o r the f o u r
representation
are
used
to m a k e
is c o n s i d e r e d
P3/2
"speed"
They
system
and
incorporate
to f i t b o t h
the d a t a
(IA, IB,
carried
Lovelace
to
formula
Conference,
diagrams
resonant
effort
Using
P3/2
Argand
widths
Wagner
waves.
16 G e V / c .
for the
solutions
and
that analysis
2 GeV/c.
l / 2 ' ^3/2 ^ r g a n d
these, only
partial
2 and
analysis
the 1 9 7 0
in t h i s
just discussed were
a Veneziano
waves
and
from
of the
is no e v i d e n c e
ambitious
between
phase-shift
after
high
a more
partial
threshold
off
using
KN d a t a
i t s
the
directly
found
of L o v e l a c e
of the a n a l y s e s
o u t by c u t t i n g 9
*'
scattering."
( H i ) The Analysis Both
Z
t h a t of
broadness
of
expected
is a ^ 2 / 2
accompanying et a l . ,
rapidity
one
III
whose
interpretable
in t h i s m a n n e r .
Quoting
Wagner's
conclusion,
resonant
solutions
the
shortest
ficial fixed tion of
MeV/c.
III
The
not r e q u i r e
do
an
parison
taken
Polarization
together,
conclusions
summarized (1)
as The
P3/2
to e x e c u t e
to
it c o m e s what
(2) the
P3/2
rapidity region
at
even
and
solu-
1124 do
disfavor
Regge
com-
prefer
IA to
analyses
can
the o n l y c a n d i d a t e
that after
down
is u s u a l l y
IB." be
expected
indicated
does
not
show
any
energy
There
to a
even
approxi-
resonance. "speed"
plots,
increase
in
in t h e
mass
the
MeV.
resonances
from
stems
the f a c t
the f o r m e r
by the
shifts
motion.
rising
for a
for a
phase
in a m a n n e r
its v a r i a t i o n w i t h
1800-2000
positive
counter-clockwise
back
amplitude
from
these
start with
As c l e a r l y
of
>
however,
Fundamentally
with
from
w a v e
some
is no e v i d e n c e ,
mating
slightly
at
predictions
therefore
and
fits
fits
follows:
Z*, does appear
maximum
resonance,
arti-
favors
smoothly
K+p experiments
from
are
Regge
the p o l a r i z a t i o n
exotic
circle.
with
independently
interpolate
existing
a clear
The
not
III
and
non-
naturally
II and
Comparison
u also
Lovelace
t h a t the
IB e m e r g e d
path m e t h o d , w h i l e
Furthermore,
II a n d
and
IA and
l or at f i x e d
from
"We e m p h a s i z e
constructions.
I.
directly
the
possibility
background
vary
that
in the
of
separating
pion-nucleon
the a m p l i t u d e s
far m o r e 385
system
associated
rapidly with
energy
than
those associated
not we believe rapidity
the P 3 / 2
with
to s t u d y
b e c a u s e of t h e added
systematic.
then
the
K+d
all
of
above
800 MeV/c
although more,
the o t h e r s
polarization
phase-shift
a bubble
for 600 M e V / c 1 2
must
processes:
,
(6a) (6b)
K + d - K°pp
.
(6c)
reactions
for are
have
is d e t a i l e d the
active
study.
important
Typical
in
totally
process, Further-
nucleon-pion absent
measurement
with in
(reaction
phase-shift
and f o r 8 1 2 M e V / c 1 1 386
studied
charge-exchange
under
d a t a , so
been
information
for K c h a r g e - e x c h a n g e 1 o
6(c)) at 600 MeV/c.
deuterium
scattering
of a d o u b l e - s c a t t e r i n g
chamber
than
statistical
s t u d y of the
a n a l y s e s , are almost
the e x c e p t i o n
both
of
system
,
there
only
KN
K + d ->- K + n p
these
below 800 M e V / c , ^
to be a
System
isospin-0
necessity
K+d
choose
substance.
I = 0
I = 0 elastic
from
isospin-
experimentally
uncertainties
The
be e x t r a c t e d
While
the
or
by
n o t we
appears
t h a n of real
the
in the
or
resonant
for
Whether
separation
whether
out earlier,
difficult
isospin-1
targets and
rather
pointed
is f a r m o r e the
amplitude
Phase-Shift Analysis As
latter.
is n o t p o s s i b l e
Consequently,
m a t t e r of w o r d s
IV.
the
is a Z ^ , t h i s
of v a r i a t i o n
1 KN s y s t e m . to call
there
with
solutions
are given
in
Table
I.
To
812 M e V / c ,
resolve
the s a m e
as o b s e r v e d
the F e r m i - Y a n g
ambiguity
t y p e of p o l a r i z a t i o n
experimentally
at 6 0 0 M e V / c
at
behavior has
been
assumed. In v i e w of the cross
section
great
interest
resonance shifts prime
in the
near 800 MeV/c to see
in this
given
peak
general
for
be an
vicinity.
I make
I = 0 KN
(see Fig. 4 ) ,
if t h e r e m a y
in T a b l e
candidate
elastic
the
it is of
elastic
The
phase
^ wave
P^
such a r e s o n a n c e .
the
Hi r a t a
et
13 al .
have
reaction section able
studied
(6c)
between
for reaction
data
below
To c o n v e r t tions
to
(6c),
is s h o w n
relationship ;
dt d
(da\
r
Mt
L
n
is a d e u t e r o n
all
in F i g .
1a v4a i l -
10.
cross
sec-
- —•) R 3 -, J
1 + R
form
cross
et al. u s e d
1 - H + (1 I *
f11
The
incorporating
sections, Hirata
R(t) = ( d a / d t ) ^ i n
and H ( t )
charge-exchange
the K + d c h a r g e - e x c h a n g e
,da, l
the
8 6 5 and 1 5 8 5 M e V / c .
3 GeV/c,
K + n cross
approximate
where
in s o m e d e t a i l
P/(da/dt) ¡¡onspi factor.
H(t)
m (/>
'
n
the
f l i p
is
unity
22t at t = 0 and d r o p s forward
direction.
direction, show
roughly
(da/dt)^ ^
obtained
in F i g . from
11
away
Thus, except close
the e x p e r i m e n t a l
crosses
as e
(da/dt)ndata
show
(da/dt)^
Figs.
of H i r a t a
the a n g u l a r
to
the
the
forward
11a a n d
et al.
lib
The
d i s t r i b u t ions
by c a l c u l a t i n g 387
from
the
center-of-
mass tem
scattering defined
faster data
factor
been divided
alternative from
values
forward
cerning
the
side
of Eq.
are
equal.
nearly (cose
little
is
three
three Away
different
However,
> 0.9),
they
in
the
differ
can be s a i d d i r e c t l y
charge-exchange
these
correction
R = 0, 1, and the
K+n
real
sys-
(da/dt)n>
(7) u s i n g
direction,
and
in the
by the d e u t e r i u m
direction
considerably,
K°
To o b t a i n
assumptions:
the f o r w a r d
corrected very
right
and
by t h a t p r o t o n w h i c h
laboratory.
on the
K+
between
by the K° a n d
in the
have
angle
angular
condistri-
bution. The been
corrected
fit to the
series
,
,2
n
In F i g s . for
the
Hirata for
data
three
values
n
with
high orders
middle in Fig.
curves
nPn(cose>
the
give
(Fig.
388
show
to
11a a n d
limits The
better the
unaffected.
fits,
what
(8).
corresponding
in F i g s .
12.
in Eq.
lib), whereas
coefficients
and u p p e r
somewhat
are a l m o s t
(R = 1)
have
•
solid curves
of n m a x
1365 MeV/c data
of the L e g e n d r e
A
to be l o w e r
choices
1585 MeV/c data
- 0.9
of R, c o r r e s p o n d i n g
1210 and
and
\Q
lib
et al. b e l i e v e
the
-1 - cose
"max
= b
11a a n d
reasonable
for
970,
fits 865
Values to
lib a r e
the shown
Although ward
cross
of n m a x
the e x p e r i m e n t a l
sections
and differ
are
very
shown, they
appear
than
the o p t i c a l
values,
poor
the
order fit gives
At
fit
cross
to tell
whether
this m o m e n t u m
a rather different
section.
statistics.
peculiar
Legendre
coefficients feature
behavior
peripheralism
increases. d a t a of
Hirata
Figs.
section data information with
from about
an e l a s t i c
and w i d t h The
11a
than
the
as the
l i b , plus
r e s o n a n c e
are
that
no g o o d
389
detail the
the energy-
change
experiments
coeffiis
an
momentum
see
if
the
total-crossand
were
1 780
by A b r a m s
f i t can be
known
consistent
of e n e r g y
560 M e V , as s u g g e s t e d
results
however,
in the
incident
I = 1 amplitudes
fluctua-
reflecting
I = 0
for
a low
to a
to
really
sufficient
in m o r e
rise
principal
counter
P-j^
not
the m a i n
et al. a t t e m p t e d and
than
at 1 3 6 5 M e V / c ,
a substantial
increasing
are
real
higher-
as g i v i n g
is d u e
e x h i b i t as
In e f f e c t ,
shape
studying
Other
c i e n t A-| .
the
of
momentum
looks
If it is r e a l ,
worth
somewhat
dependent
The data
effect.
it is p r o b a b l y well large
as well
this difference
t i o n or to a real
with
11a)
value
greater
The only
(Fig.
for-
sets
a largely
amplitude.
a n y of the o t h e r m o m e n t a , forward
in the two
indicating
lower-order
is 1 3 6 5 M e V / c .
to the
to be s u b s t a n t i a l l y
charge-exchange
at w h i c h
of t h e s e
sensitive
significantly
fits
forward
values
et
MeV al.^
obtained
with
these
fairly with
specific
easy
to s e e .
the d o m i n a n t
amplitude would
A resonant
lead
This means
that
are
to fix
to w h a t
up this
total
section
or
process
has a b r o a d m a x i m u m
maximum
appears
respectively expected
in T a b l e
2.
amplitude
to c o n t a i n
of w a v e s
and
passing
t h a t the
significant
I = 0
90°.
resonance
Examples
of
elastic
that expected
large
by
the possible,
P-j/2 P ^ a s e
enough
of m a s s fits
reduction
room
D waves and
of 8 0 ° and
in the
that
contributions
It is
such
f i t s , the
the a s y m m e t r y
cross
other
I = 0
is n o t c a u s e d
of the v a l u e s
provides
there
at a b o u t 7 0 0 M e V / c ,
through
to a c c o m m o d a t e
to r e v e r s e
from
11.
waves
6 5 ° a n d 7 2 ° at 8 6 5 a n d 9 7 0
In t h e s e
from
either
good fits with
instead
interpretation sections
it is t r u e
560 M e V .
in Fig.
of o t h e r
contributions
for an e l a s t i c
and width
charge
in the
Thus, while
namely with
in
room
waves.
shifts,
peaking
in the c h a r g e - e x c h a n g e
in l a r g e
to o b t a i n
phase-shift
However,
to add
however,
interfering
S-j^
amounts
are
asymmetry.
section
amplitude
which
is o b s e r v e d
substantial
cross-section
from a number
P-j^
to b a c k w a r d
is n o t m u c h cross
for r e a s o n s
1 = 1, n e g a t i v e
exchange, opposite
needed
inputs
1780 are
MeV/c 90° MeV shown
in P-|/2
simple
resonance
in the
cross
substantial
provide
enough
agreement
with
t h a t n o t all
pos-
experiment. It is sible
important
phase-shift
to e m p h a s i z e
solutions 390
have
been
studied;
and,
indeed,
that
smaller
P-]^ P^ase
information
there
are
shifts.
is n e e d e d
solutions
from
presently
available.
each
but
65-72°
it d o e s
This
does
elastic
with
to f o l l o w
of the
the
Remarks
on
1 GeV/c;
simplest total
a purely-resonant
various
possible
simple
Inelastic
States
MeV/c, prescrip-
range. near
of a P - j ^
^y_
however,
resonance data,
P-j^ P a r t i a ^
is
namely
it d o e s ,
cross-section
elastic
not
conclusion
9 0 ° in this m o m e n t u m
below
the
the
800-1000
n o t r u l e o u t the e x i s t e n c e
pretation
V.
range
much
polarization
s h i f t can be l a r g e ,
through
with
such data are
The only clear
not appear
resonance
disagree
to d i s t i n g u i s h
in the m o m e n t u m
t i o n of g o i n g
solutions
Accurate
other, and
t h a t the P - j ^ p h a s e around
probably
inter-
namely
wave.
Produced
in KN
I n t e r a c t i ons I now w a n t the
inelastic
states
the n e i g h b o r h o o d KA a n d Again and that
K*N all
to m a k e
then drop
brief
produced
of 1 G e V / c .
production these
some
cross
are
smoothly.
the f o l l o w i n g
by KN The
shown
sections
remarks
interactions
cross
is, the
KA, makes
It is i n t e r e s t i n g
relation
approximately
I = 0 system, which cannot
up for
this
3b a n d
by p r o d u c i n g
391
in for
13.
to a m a x i m u m
ao(K*N) £ a](K*N) + a](KA)
That
sections
in Fig. rise
concerning
to
note
holds:
.
produce
a large
amount
of K*N total
in o r d e r cross
The near of
angular
distributions
are
simply
high-energy
P-exchange
4
equality
seems
Similarly,
havior within
KA
of
production extrapolations
The magnetic
to d o m i n a t e
for
100 M e V / c
is o b s e r v e d
for
the l o w - e n e r g y
behavior.
amplitude
threshold.
just what
the n e a r
sections.
1 GeV/c
the
to s a t i s f y
K*N
right
production
of t h r e s h o l d
at high
dipole
is
energy.
at
the
be-
qualitatively Fig.
14
shows
the d i s t r i b u t i o n s
of the c . m .
K* p r o d u c t i o n
angle
9, of the J a c k s o n
polar
a , and of the
Treiman-
Yang
angle
at 1 2 1 0 M e V / c
also
[KN
shows
process.
zero
(9a)
K+n
K°Tr + n
,
(9b)
.
(9c)
one
+
K*+n
p
->
+
K*
p
+
K
+
TT°P
t h e n be c o m b i n e d
K*NJj
=
Q
by u s i n g
to s t u d y
Eq.
(2).
the a n g u l a r d i s t r i b u t i o n s
partial
K* p r o d u c t i o n
exchange
reactions: ,
It is e v i d e n t
hold, many
the
K + 7r~p
r e a c t ions can
process
for
K + n -* K * ° p
K
These
angle
and
are
appears
is far m o r e
production
which
duction, Aaron
et al.
the r a p i d o n s e t of
for this
present.
The
to be d o m i n a t e d
peripheral
goes
In s p i t e of the a p p a r e n t 1 5
Fig.
that even just above
waves
than
principally complexity
have
392
14 latter
thres-
isospinby ir
the
isospin-
v i a to e x c h a n g e .
of the N K *
strongly
K* p r o d u c t i o n ,
the
argued
dominated
pro-
that presumably
by an S - w a v e an
S -J ^ 2 the
D
d
an
3/2
d
resonances.
the final
NK*
partial-wave
with
state.
however,
(Fig.
is n o t
suggestive
resonant VI.
behavior
near
even
a m o u n t of S - w a v e
in
a
detailed
state
out.
is
very
It is
worth
s h a p e of a Q (KNTr)
of s t r o n g l y
inelastic
GeV/c.
Conclusions In c o n c l u s i o n ,
one a n d
they are energy
the
isospin-zero
compelling
evidence
very
of r e l e v a n t
the r a t e s
such
conditions
for
p a r t of the observed
studies
have
involve
of
the d i f f e r e n c e
is a l s o
the a m p l i t u d e s obey
background
t h e y are p r e s e n t
than
KN, a n d
the o n l y
If s u c h
are
exist
with faster
background.
Under
between From
resonance
and
the p o i n t
of
only a semantic
corresponding SU(3)
symmetry
f o r the r e s o n a n t
requirement
problem.
to 27 and and
10
form
behavior
representations.
in b a r y o n - m e s o n
393
isospin-
no
in the o c t e t a n d d e c i m e t
Thus
of
yielded
variations
be s e m a n t i c .
systems
not
resonances.
of v a r i a t i o n
of S U ( 3 ) , t h e r e
baryon-meson
of
amplitudes which
b a c k g r o u n d m a y well
Presumably
results
KN s y s t e m s
broad and
than
view
generate
14
t h a t the
1.1-1.2
by
in Fig.
final
not been carried
again,
to
asymmetry
a large
of t h i s
fed
point out that
cose
remarking 14)
is l i k e l y
Unfortunately,
analysis
a n d has
and hence
They
forward-backward
inconsistent
complex
state
incident waves,
D3/2
large
is n o t
in the final
systems
is t h a t t h e r e
other be
consistency
in denoting
them as background or
reso-
nant. The I = 3/2 nucleon-pion
system, which
is
roughly 50% a 2 7 - r e p r e s e n t a t i o n , has n £ e s t a b l i s h e d resonance w h i c h m i g h t easily c o r r e s p o n d to the sible P 2
discussed
earlier.
The I = 1/2
n u c l e o n - p i o n system has a substantial It does have a low-lying
P-j/2
r e s o n a n c e
least in principle could c o r r e s p o n d P1^2 n e a r l y - e l a s t i c nucleon-pion
P^
To >
component. which at
to the
Z* discussed above.
r e s o n a n c e at 1470 MeV
amplitude c o r r e s p o n d i n g
10 P-j^
proposed
If the is not a
m a n i f e s t a t i o n of the Z * , SU(3) symmetry that there be a substantial
pos-
requires
background
to that observed
in KN.
This c o n t r i b u t i o n m u s t be taken into a c c o u n t in obtaining
the properties of the
N*(1470).
VII. Other M a n i f e s t a t i o n s of Exotic
Channels
I w a n t to m e n t i o n very briefly two other items of information on exotic systems. 5 GeV/c K~p scattering
new
First, the
shown in Fig. 2 of the
first
lecture indicates a definite backward p e a k , some orders of m a g n i t u d e below the peak from K + p ing.
two
scatter-
This effect need not require a Z^ in the u-
channel : pretable
it is very small
and likely to be
in terms of m u l t i p l e e x c h a n g e s .
Fig. 15 shows the K + TT + mass d i s t r i b u t i o n
inter-
Second, from
the
reaction K + p -»• K+PTT+TT~ over an enormous spread of
394
incident momenta events these
in the enormous
pletely
(2 - 13 G e V / c )
"World
roughly
D a t a S u m m a r y Tape."''®
statistics
s m o o t h and
from
shows
the d i s t r i b u t i o n no e v i d e n c e
395
of
80,000 With
is
com-
structure.
REFERENCES 1.
G. L y n c h , H y p e r o n
Resonances-70,
(Moore
Company, Durham, N.C.,
p. 2.
Publishing
E.C.
Fowler 1970),
9.
D.V.
Bugg
et al . , P h y s .
Rev.
R.L.
Cool
et a l . ,
R e v . D]_, 1887
T. B o w e n 3.
ed.
The
et a l . ,
polarization
following
Phys. Phys. data
Rev.
1_68, 1 4 6 6
D2_, 2 5 9 9
in F i g .
(1 9 6 8 ) ; (1 9 7 0 ) ;
( 1 970).
2 are f r o m
the
references:
K+p
-- J . G . A s b u r y
194
(1969);
K~p
-- S. A n d e r s s o n
et a l . ,
Phys.
Rev.
et al . , N u c .
Lett.
Phys.
23^
Bj21_, 524
(1970). 4.
R.W.
Bland
and N u c . 5.
A.A.
Phys.
Hirata
published 6.
et al . , N u c .
p.
Bl_3 , 595
Physics
et al . , P h y s .
J.D.
(1 969)
(1 9 7 0 ) .
et a l . , U C R L - 2 0 2 6 9
in N u c l e a r
R.J. Abrams See a l s o
Bl_8 , 537
Phys.
( 1 971 )(to
be
B).
Lett.
Dowell, Hyperon
3013 , 564
( 1 969).
Resonances-70,
53.
7.
S. K a t o
et al. , A N L / H E P
8.
R. A y e d
et a l . , P h y s .
9.
C. L o v e l a c e
and
7115
Lett.
(1971). 3 2 B , 404
F. W a g n e r , N u c .
Phys.
( 1970). B28,
141
(1971). 10.
S.
Kato
et a l . ,
Phys. Rev.
11.
V.J.
Stenger
12.
A.K.
R a y et a l . , P h y s .
et al . , P h y s .
396
Rev.
Lett. Rev.
24_, 61 5 (1 9 7 0 ) . 1_34_ B i l l !
183, 1183
(1 9 6 4 ) .
(1969).
13.
A.A.
14.
For d e t a i l e d Fig.
15.
Hirata
et a l . , N u c . P h y s . references
1 0 , see R e f .
R. A a r o n
B30,
to the d a t a
157
(1971).
used
in
13.
et al . , P h y s .
Rev.
Lett.
26,
407
(1971). 16.
I am
indebted
to Dr.
F. M u l l e r
397
for t h i s
graph.
o
o
t/1
10 JC
co O-
Cl.
—* IO -C c O 0) E II O s
LT)
CM +1 co
co
to cu
en +i
m
O • r— +1 co CM
CM
* CM r— r— +1 +1 CO 00 O
o 11
co
•
«a+i o • r— CM CO • m +i
s (Il o r— - J n_ E +J co +1 +1 CM CM • i— r—
T a b l e I I K N 1 = 0 p h a s e s h i f t s (6), i n e l a s t i c i t y c o e f f i c i e n t s ("n), and p a r t i a l c r o s s s e c t i o n s f o r the m o m e n t a 865 and 970 M é V / c . S e t of s o l u t i o n s c o r r e s p o n d i n g to l a r g e P 1 / 2 w a v e s . F o r the 1 = 1 p h a s e s h i f t s we u s e d the s e t r e p o r t e d a t the Duke C o n f e r e n c e by Hall et a l . 9
Wave 865 MeV/c
S
l/2
P
l/2
P
3/2
D
3/2
D
5/2
"total f r o m fit 970 MeV/c
S
l/2
P
l/2
P
3/2
D
3/2
D
5/2
"total f r o m fit
6 (deg)
o
«
ro
0
m ro
O -i-» O
LO CN
Ë o u
•
eg
(D '—' (0 O •a \ e z> •oH LU -M O ou -
t-,
i l ,0 to c Z. •f« o UJ a r : (d a •M ni n 'O O
rC H
tau)
403
404
405
=
•
¿-A
j
1
1 1
E _ •o Q„> O ~
JJÜU2SOLUTIOI SOLUTIO:
S
•0 O
m ; ® »-*« T4
> _
S
» -
i i i o o io
3 c , 3d
in the
of the m a s s energies,
to
for the
state
how
strange thesized are
nant amplitudes? only difference
'
center-of-mass
by
at n o t
virtue too
(7) q u a l i t a t i v e l y cross
to
the
section
(3b).
(3a,3b)
between
resonances:
to the
which
resonant
differ
and
nonhypo-
arguments
non-reso-
p o i n t of v i e w , and
be
to
the
these
what about
can
same
to w h i c h
Clearly
re-
(3c,3d).
the s t r a n g e
F r o m an S U ( 3 )
428
(3d)
It r e m a i n s
b u t at e n e r g i e s
belongs.
of
high
accounts
same arguments
of the m u l t i p l e t
between
momenta
angular
Since,
n o t at p r e c i s e l y
splitting
for
2
fd ( fd> "
the g r o u p
energy,
resonance
sensible
that
(3a)
be d o n e ,
members
(7)
P
P^^
P f j are t h e
reactions
momentum
P
the
non-resonant
amplitudes tion to
is in t h e i r
(7), h o w e v e r ,
the e x t e n t
phase-space
that
like
initial
states,
volving
incident momenta,
small
t h a t we h a v e To
tive
give
attempt tive
in p r i n c i p l e
to t h a t of
the c h o i c e obtained.
The
=
for
for
Fig.
In r e l a t i n g
1. same
the
laboratory
differences typical
strange
(3c)
in c . m .
energy
differences
obviously
partial
to
curve
(3c) we
(which
roughly
between
an
effec-
range
under
study).
very
crude
and
roughly
waves. in
Fig.
the
(3a, b and shown have
d)
in used
corresponds
to
corresponding
strange
While
the d a t a
when
are
and
a given multiplet
429
than
shown
drawn
1 for r e a c t i o n s
momentum
in-
quantita-
an e f f e c t
curves
(3a,b)
com-
partial-wave
results
hand-drawn
baryons within
momentum
have
the
three
one
be f o u n d w h i c h ,
the a c t u a l =
assuming
to
a
whether
(7), w o u l d
each
them.
a somewhat more
of I , &e.f.f c o u l d
and
sufficiently
have considered
predictions
the
but t h e s e are
t h i s , we
equivalent
barrier
effects
Rather
into
dependence:
different
the a m p l i t u d e s .
substituted
3 are
barrier
rela-
s for
of
value
With
at e a c h
(3c) w i t h
are a l s o
ideas
test requires
decomposition
and
neglected
these
of t h i s
In p r i n c i p l e , w h e n
(3a)
there
The
represents
it a p p l i e s
amplitude.
reactions
on s.
independent
it v a l i d l y
effects,
partial-wave pares
is
dependence
non-
in
the
the m o d e l
for
(3b,d)
is somewhat
sparse, fied
it
is e n t i r e l y
in F i g .
procedure
2 can
we
have
A perhaps SU(3) ing
is
be r e m o v e d
more
in t h e
with
With Meshkov
found
that whereas
both
inhibited
Berge
K+Z")
extent. side as
It is
the
thermic
process.
in
the mass
(8a)
tunately, d)
in
are
side It
is
the
+
method
(by
help of
Lipkin
in
(8a),
again
mask
better
D r . D.
in
and
are
same
left-hand
reaction
where-
a highly
endo-
surprising
that
the
symmetry.
For-
off
than
analyses
made.**
case
of
not
corrections
in t h e
that
the
the
exothermic
been
orders
endothermic
to a b o u t
5
satisfied,
recognized
highly
430
and
several
partial-wave
than
comparison
approximately
therefore
have
of
Harari
contains
angular-momentum-barrier
With
(8b)
differences
K ~ p ->- TT + Z" r e a c t i o n
(3).
.
hand,
(8a) w e a r e
objectively
follow-
K°S~)
differences
in t h a t d e t a i l e d
more
the
of
= a(K~n
a somewhat
right-hand
of
test
(8a)
immediately
the o t h e r
represents
low-energy
,
violated
reactions
On
of
K°H°)
(8b) w a s
badly
by m a s s
type
typi-
= a(K"p +
4 et al. , and
5,6),
(8b),
the
confrontation
et al.'s
(Eqs.
magnitude).
problem
experiment:
a(iT~p +
very
the
with
interesting
a ( K " p - TT + z")
(8a) w a s
that
followed.
involved
relations
clear
of
in of
(3a,b,c, the
Therefore, can
be
the
reactions
Kane, we
have
made
compared
his
partial-wave
and
phase-space
experimental This
effects
d a t a on
comparison
found
simple
to the form
for z e r o
K ° 5 ° final
of Eq.
radius
seven
K°5° data this
of
X2
values
The
of
cross
butions the d a t a
This
fit
than
low
particularly comparison
exotic
exchange
a very
small
three
forward
improve
uses
one f i t
the only
solution
The
5 is v e r y The
the
section
4 and
is
with
The about
reproduced.
of the f a c t
that
very
precisely
K°H°
system
satisfactory
processes
431
5.
(8) all should
in the f o r w a r d
already
distri-
is
angular-distribution
reactions
section
versus
are c o m p a r e d
is n o t well
to w h i c h
for
solutions.
the m a g n i t u d e
shape
Of
the
T h e x^
the o t h e r
not determine
endothermic
cross
to
valid
of f r e e d o m
and at h i g h e n e r g y
cross
had
as f o l l o w s :
a consequence
sensitive.
of F i g .
for
is f a i r :
waves
fact, i 1 1 u m i n a t i n g .
The
is s t r i c t l y
4 a n d 7 in F i g s .
surely
partial
them
any other.
by t h a t
the f i t to TT + E~ d o e s the
he
and o n e of the a n g u l a r
but the d e t a i l e d
is a l m o s t
as
It a l s o
solutions,
150 or m o r e
cross-section right,
state.
existing
K"p
to c h a n g e
97 for 44 d e g r e e s
of R e f s .
(7)) w i t h
be s u m m a r i z e d
better
predicted
barrier
interaction.
can
sections
for
solutions
(7) t h a t
acceptable
far
fit was
Kane's
no a t t e m p t
The results Kane's
(via Eq.
the r e a c t i o n
used
them w i t h
the f i t
solutions, corrected
show a
and, in involve show
only
direction.
depressed
at low e n e r g y ,
but
the
exothermic forward
( K ~ p -»• T T + E ~ )
one
peak
as
seen
suppressed
by
It
is
clear
at
low
due
thus
energy
to
the
difference It
the
tistics
the
show
This
made
absence
peak
of
is
partial
largely
to
forward K+~~
high
sizable
in g o i n g
K+E", of
a
K°s°.
peaks
is
in
part
waves
by
mass-
effects. worth
pointing
out
that
incorporate
the
same
phase-shift
analysis.
the on
latter low
Elastic be
SU(3),
even
waves
from
easily
expects
t £
and
limited,
Scattering
shown
one
are
partial
obtainable
It c a n
between
5.
to
to
on
III. T h e
exact
that
inhibition
information readily
Fig.
corrections
for
is a l s o
worthwhile into
the
in
tends
the
SU(3) that
K°S°
they
be
states
Although
which
high
it m a y
sta-
provide may
not
statistics
be
in
Relations in t h e
following
limit
of
relations
amplitudes:
A(IR+p
TT+ p )
-
+ A ( TT+ p +
K+£+ ) = A (K+p
+
K+p),
(9a) A (IR~ p
TT" P )
+ A ( K" p ->• T T " Z + ) = A ( K~ p
K"p). (9b)
These
relationships
corresponding
A(K~p
types
K"p)
of
are
SU(2)
very
similar
to
the
relations
+ A (K~ p -> K ° n )
= A (K"n
K"n), (10a)
432
A(K+n
K+n) + A (K+n
K°p) = A ( K + p
K+p) (10b)
s u c h as ir+p
Reactions are
SU(3)
tions,
generalizations
namely
cally
enough
pendent
isospin-values.
I shall easily neath
prevents
the
same
show y o u ,
the
effects
understood, reveals
Before (9a) a n d of the
the choice
For r e a c t i o n s
a n d the
itself
getting
(9b)
have
automati-
of b u t two to the two
symmetry
indetotal
symmetry
simplifications; this
is
but
breaking
pattern
as are
under-
impressively. to t h i s ,
been
I should
previously
point out
subjected
that
to
tests
form: K V ) |
| A ( TT+P
|| A U + p
>
- w+p)|
I A(K+p -
| A(TT"P
Obviously of
these
inequalities
(9a) and
(9b).
by t a k i n g
cross
and
generally
(lib)
Yet
sections
are
-
K+p)|
|A(K~p + K"p)|
I A(K~ p
tests
are
(9), SU(3)
of
In
independence
relations
corresponding
reac-
reactions.
(10), charge
into
amplitudes,
breaking
of c h a r g e - e x c h a n g e
so t h a t t h e s e
incorporated
K~p •> ir~E+
and
hypercharge-exchange
the c a s e of r e a c t i o n s precise
K+E+
(11a) (lib)
-»- i r ' p ) |
relatively
if a p p l i e d
weak
naively
at a given m o m e n t u m ,
fail.
433
For e x a m p l e ,
in
the
(11a)
forward d i r e c t i o n , slightly
sharper
the o p t i c a l
inequality
[ J f U + p + K+Z + ) J t = 0
theorem l e a d s to a
than
(11),
> K [aT(/p)
-
aT(K+p)]2,
(12a)
where K = . 0 5 1 [mb i G e V l 2 ] " 1 Putting
i n numbers a t
some t y p i c a l
.
momentum,
for
e x a m p l e 5 GeV/c, a T (iT p) = 2 6 . 6 mb, a T (K p) = 1 7 . 2 2 mb from w h i c h t h e r i g h t
side
i s 4 . 4 mb/(GeV/c)
The m e a s u r e d v a l u e of t h e l e f t 0.41 ± .04 mb/(GeV/c)2.8
side,
There i s ,
however,
is
therefore,
o r d e r - o f - m a g n i t u d e d i s c r e p a n c y g which p e r s i s t s o t h e r momenta.
Meshkov e t a l .
a procedure analogous inelastic
processes
same Q v a l u e correction
and m u l t i p l y i n g
factor.
Oy(K + p) r e l a t i v e the extent It i s ,
however,
Q makes l i t t l e
at
for
the
comparing at
by an
The c o r r e c t i o n
the
appropriate factor
increases
to a ^ ( i r + p ) and f i x e s up ( 1 2 )
that the i n e q u a l i t y
an
f i x e d t h i s up by
to t h a t d i s c u s s e d
(3a,b,c,d),
.
i s no l o n g e r
to violated.
e v i d e n t t h a t comparison at the sense:
it
implies,
for example,
one c o m p a r e s t h e ir + p -»• K+E+ r e a c t i o n
near the
MeV r e s o n a n c e w i t h t h e T T % ->- IR + p r e a c t i o n 1236 MeV r e s o n a n c e .
Such a c o m p a r i s o n 434
same
near
could
that
1950 the
obviously
have
contrary,
it
K+E+
are
related
to
nothing
is
t o do w i t h
evident
that
be compared a t
i n some a p p r o p r i a t e
How d o e s one do Consider the o p t i c a l
the r e l a t i o n
are
6.^
Again
in
C C T
plotted the
is
T
( I T " P )
values
the
as
little
recent
to
between
is
(9b)
is
satisfied
is
real
in
the forward
analogy
to
reaction
K+p
to
forward
of
then
are
be e q u a l ,
cross
the
(12b).
Of
(using
of
should
sections
K+ charge-exchange
435
it
Fig.
greater
side,
changes
the
exact
direction.
from w h i c h
of
left,
most
The n a t u r a l
amplitude
(10b)
sides
than
equal , and,
the
(12b)
- a-|-(K~p))
and
limit
using
.
the r i g h t
inter-
SU(3),
consequently, for
K~p -*
The
remarkable
T T " E
be e v i d e n t :
no m a s s - d i f f e r e n c e
and K + n t o t a l
sured
-»-
o f momentum i n
60 G e V / c .
i n the
Again
and r i g h t
inequality
3 GeV/c
if
are
P
>
larger
(a-j-iir'p)
and a ^ ( K " p )
there
is
constancy
data)
that
left
side
Oj(ir~p)
(10b)
the
the
near
Serpukhov
pretation
+
K + p -»- K + p .
(9b).
t =Q
a function
namely, the d i f f e r e n c e very
to
AT(K'p)]2
-
of
right
contradiction
interest
TT
have
,V)]
(K-p *
(12b)
and
same e n e r g y and
fashion
theorem we s h o u l d
Experimental
IR+p
On the
this?
first
.051
-»-
IR+p
the
SU(3).
effects,
+
in and
the
are d i r e c t l y
mea-
follows
the
amplitude
is
that real.
This The
analogy
reality
K+n
of the
to the e x c h a n g e and
is, of c o u r s e ,
tributions this
exotic
degeneracy K) .
Since
and h e n c e
obvious why derived
this
from
of the
do
is
intimate. connected
p and of
exchange
imaginary From
Similarly,
the
Ky
of
(vector
from
resonances,
cancellation
Ky
are
not
it is n o t
occurs.
duality diagrams^1
of
the
K) a n d
K"p or it~E + s y s t e m s
have
reso-
the r e a l i t y
arises
or f r o m
con-
duality,
for the absence
K~p -»• tt"e + a m p l i t u d e
the f o r w a r d
(tensor
the
amplitude.
accounts
in KN c h a n n e l s .
exchange
of
cancellation
to the f o r w a r d
cancellation
nances
K°p a m p l i t u d e
degeneracy
to the c o n s e q u e n t
even more
It can the
as be
follow12
ing
simple
Looking
at Fig.
reaction gram
arguments
The
are
the
the e x o t i c the l o w e r
Ky and ment
Ky
couplings
as t h o s e
for
K~TT~ -* T T ~ K ~
the
exotic
does or
contributions
Ky a n d
same
as
the
1/simra
cancelled,
i.e.,
is not g i v e n .
upper
(Fig. 7 b ) , and
at
pE+
vertices
(Fig.
7c).
the c o u p l i n g s This
it is the
terms
This 436
K^ at the
be e q u a l .
the
dia-
of
that
not say w h e t h e r
the
both vertices
£+ p
reaction
to
by the
those for the
in K"p -* -rr~£+ m u s t
still
are
of
by f a c t o r i z a t i o n
sin-rra t e r m s which
same
vertex
It f o l l o w s
factorization.
be r e p r e s e n t e d
couplings
reaction
of the o t h e r
on
7 , the f o r w a r d
K"p -> tt~E + c a n
(7a).
vertex
based
of the
relative can
to
argu-
e~ 1 7 T O t /
signature s i g n of
be r e s o l v e d
the
either
from the d u a l i t y calculation Since ity
of
relating
forward to
occurs
exemplified
has
direct
tt"z+ the
in
complete all
three
for
is
these
that
One c a n , namely,
reactions
reaction
doing
this
considering
the
that
(in is
of
the
the
by
by
SU(3)
the
(b)
as
to
real
of
K~p -+
(9b)
and
more
analyses partial-
imaginary
A possible
be d i s c u s s e d
partial-
make much
compare,
and
by
symmetry
use p a r t i a l - w a v e
in
Schmid
in accord with
course,
this
tested
reality
the
positive
SU(3)
implied
amplitudes.
will
of
real-
That
successfully
direction
wave by p a r t i a l - w a v e , of
implies
validity
equality
tests:
resonances,
which cancel.
of Oy(tt~p) , a^.(K"p)
wave a n a l y s e s .
of
(9b)
forward
experimental
limit)
the
demonstration
the
tt"z+.
been shown i n d e t a i l
Thus,
by Eq.
K"p
SU(3)
resonances must c o n t a i n
contributions
and S t o r r o w . 1 2
the
K + n ->- K ° p w i t h
amplitude
baryon
and n e g a t i v e actually
or from a t - c h a n n e l
K p ->- t t " e + c o n t a i n s
its
couplings
diagrams
parts
procedure
i n more d e t a i l
in
(9a).
One c a n t e s t lowing
way.
Kalmus
et a l . , ^
(9a)
Using
the
for
at
low e n e r g i e s
partial-wave
i r + p -»• K + Z + ,
in
the
analysis
one
folof
multiplies SL
each p a r t i a l - w a v e imaginary
parts,
CTj(Tr+p)
at
aT(K+p)
according
the
Kalmus
the
et
amplitude
by
and c o m b i n e s w i t h
same m o m e n t u m t o
al.
(P^/P.)
to
(9a).
solutions 437
the
compare
The r e s u l t
, adds
the
values
of
with obtained
192B a n d 2 0 9 B i n
the
with
momentum
range between 1.2 and 1.8 GeV/c is shown
in Fig. 8 . ^
The total
n + p cross section
cruv®) has a large peak produced by the resonance. of ir+p
(solid
1950-MeV
After combining with the imaginary
K + Z + according
the squares and dots
part
to (9a), one is left with
in Fig. 8 c o r r e s p o n d i n g
two solutions of Kalmus et al.
to the
These display a
nearly c o n s t a n t cross section of m a g n i t u d e
around
22 mb.
is in
The c o n s t a n c y of the cross section
a g r e e m e n t with the energy d e p e n d e n c e of a-j-(K+p) and tests SU(3) p r i n c i p a l l y
through the
of the A ( 1 9 5 0 ) , which d o m i n a t e s energy of a j ( n + p )
couplings
the v a r i a t i o n
with
in the region under sttrdy.
The
m a g n i t u d e of the c o n s t a n t cross section i$ »bout 4 mb higher than the actual
value of a T ( K + p )
instead of 18 m b ) ; this is precisely section d i f f e r e n c e K~p total
the
(f£ mb
cross-
seen b e t w e e n the "equal" TT'P
cross sections
in the d i s c u s s i o n of
and
(9b).
T h u s , in the same sense that Oy(7r"p) = O y ( K ~ p ) , we can consider a T ( K + p ) = 22 mb instead of 18 m b , the d i f f e r e n c e of 4 mb coming from mass between TT and K. A(1950) obey SU(3) background
differences
It follows that not only does in its c o u p l i n g s , but so do
amplitudes which m a k e up the K + p
the the
elastic
scatteri ng. We now consider
high-energy
tests of
(9a).
Using the exchange d e g e n e r a c y noted to be true
438
for
to K"p -> TT~£ + , w e go to t h e
Ky, K t couplings reversed the
Ky r e l a t i v e
inary this
n + p -* K + £ + , w h e r e
reaction
forward case,
to the
(12a)
can
the r e v e r s a l
Ky c o u p l i n g
amplitude
line-
leads
( j u s t as f o r
of
to an
imag-
l
"a" so as to m a k e
function J Q
section, namely
by a
As
£ = Pa w h e r e
Using
follow
discussed
form J Q ( a / ^ T ) , which
to H a r a r i ' s , w e c h o o s e of the Bessel
peripheral.
to a m p l i t u d e s
angular momentum
center-of-mass
non-Pomeron-
lecture.
be h e a v i l y d o m i n a t e d
to an o r b i t a l
dis-
f a c t o r , o n e can
in the f i r s t
t e r m of the g e n e r a l
changes
accord
already
and H a r a r i ^
t h e r e , the c o n t r i b u t i o n s K V
highly
barrier
of D a v i e r
factor
is in c o m p l e t e
lecture, that the
contributions
To c a l c u l a t e
elastic
the b a r r i e r
correction
of
data.
as
high
about
50%. To c o m p l e t e up v e r y
briefly
degeneracies
this d i s c u s s i o n , on the
exhibited
p, k^
anc
I want
' ^v' ^T
in KN c h a r g e
440
to e x c
follow
^an9e
exchange
and
in
irN h y p e r c h a r g e change
exchange.
degeneracy
relations
must
that
hold
It f o l l o w s
from
the f o l l o w i n g
at l e a s t n e a r
this
ex-
cross-section
the f o r w a r d
direc-
tion :
( K + n - K°p)
g
= ^
Jjf (K'p - » V )
The comparison
of
(K"p -
= {jf ( / p
(14a)
poses
no
in t h a t o n l y
a single
nucléon,
and a s i n g l e
t y p e of m e s o n ,
involved
in b o t h
difference Cline
effects
et a l . ^
tisfied
.
(14b)
kinematic
t y p e of b a r y o n , kaon,
of e a c h r e a c t i o n .
Thus
showed
experimentally
(14a)
the
therefore
first
,
-> k V )
problems
sides
K°n)
pi ay l i t t l e that
above
(14a)
or no
is well
5 GeV/c.
The
the is mass role. sa-
latest
18 information
at
12 G e V / c ,
firms
with good
sions
of C l i n e
accuracy et
ences.
because
Thus
sible
to
right
side.
parison?
The
How
cult which
to a p p l y
of the
side
10,
of the
poses
K-tt and
energies
then
E-p mass
conconclu-
here b e c a u s e , are
in a d d i t i o n
to
it is
accesthe com-
angular-
is p a r t i c u l a r l y
relevant,
441
a proper
of m a k i n g
more
differ-
the t - r a n g e
to m a k e
procedure
corrections
angular momenta
considerably
is n o t the s a m e as f o r
is one
previous
momentum-barrier
the v a l i d i t y
(14b)
for finite
the l e f t
in Fig.
al.
The comparison difficulty
shown
diffi-
deciding necessary
to
note
that since
r i g h t s i d e of
(14b)
to be c o m p a r e d splittings
the q u a n t u m
numbers
are d i f f e r e n t ,
at e n e r g i e s w h i c h
typical
of l e f t
t h e y are
differ
of n o n - s t r a n g e
really
by the
and strange
b e r s of a g i v e n
SU(3) multiplet.
This means
at i n t e r m e d i a t e
energies
side
expected
to be f a v o r e d
agreement with
procedure recent the
over
experiment,
w h e r e w e do n o t splittings,
the l e f t
which
to
has a c t u a l l y
t e s t of Eq.
(14b)
memthat is
in
energies
to S U ( 3 )
know w h a t
mass
(14b)
the r i g h t s i d e ,
know what happens
it is h a r d
of
b u t at h i g h
and
mass
to e x p e c t .
been followed
is to c o m p a r e
The
in a
on b o t h
sides
quantities dUn(^)] dt
the
slope
of the f o r w a r d
peripheral
be n o t e d
Eq.
TT+P -* K + Z +
cross
differences. mental
tt~E +
cuts cross
section
The
w o r k , are
cross
(15b)
K"p
d t
-0.4
the s o - c a l l e d
p a r t of the
peak,
and
•-0.03
*
CT
that
(15a)
tfo
problems
discussed
be t a k e n
as c o m p a t i b l e
off m o r e section
based
in F i g .
above,
(15b)
It
forward
t h a n of
the
kinematical
on r e c e n t 1Q
11.
should
of the
of the
the r e s u l t s
with 442
,
section.
because
results, shown
dt
Given
experithe
in F i g .
the v a l i d i t y
11
of Eq.
must (14b),
though u n d o u b t e d l y f o r Eq.
they are l e s s c o m p e l l i n g
than
(14a).
I want to add two comments r e l e v a n t preceding
analysis
and to the
barrier corrections. such c o r r e c t i o n s the i n s e r t i o n
F i r s t of a l l ,
to the r a t i o
consideration.
in all
cases
have been of the form P
of a f i n i t e
radius
without
of i n t e r a c t i o n . small
£/P f o r the p r o c e s s e s
under
be t r u e f o r S U ( 3 ) a n a l y s e s of r e s o n a n c e S e c o n d , I want to come back b r i e f l y difference
proved
to the 4 mb
between irN and KN
from m a s s - d i f f e r e n c e
effects
explain
in a l i t t l e
about.
C o n s i d e r a g a i n the tt~p and K~p t o t a l
more d e t a i l
to
widths.
arising
in order
to
how t h i s m i g h t come cross
s e c t i o n s w h i c h , above about 3 GeV/c, are equal the l i m i t of e x a c t S U ( 3 ) . further manifest individual
itself
This
equality
t y p e s of f i n a l
cross
factors
which d e p r e s s
t i v e to t h e i r prising
the K"p c r o s s
ir'p c o u n t e r p a r t s .
t h a t such e f f e c t s
still
slowly.
barrier
sections
I t may seem
increases
443
relasur-
o c c u r at 60 GeV, K+E +
these e f f e c t s decrease with energy Furthermore,
which
However,
lead to
but as was seen i n the s t u d y of the ir + p reaction,
between
sections
states.
K-tt, Y * - N * , e t c . , mass d i f f e r e n c e s
in
must
through r e l a t i o n s
tt~p and K~p channel
l e a d to s i m i l a r
It
i s always
T h i s has a l s o g e n e r a l l y
total-cross-section
the
angular-momentum-
a p p e a r s t h a t the e f f e c t i v e r a d i u s relative
to a l l
very
of m u l t i p l i c i t y
with
energy
tend
to g i v e e v e n m o r e
mass-difference
effects
of a s i n g l e c h a n n e l + + + as 77 p •+• K Z
.
of w h a t
happens
KN total
cross
of
This at
raises
sections
My own
probably
per
they come
particle
disappear.
effects the
the m a s s
differences.
has
to s h o w
understood
that there
are
of S U ( 3 )
IV.
t-Channel
SU(3)
Relations
s u c h as
satisfied
symmetry
for
momentum
transfer.
in t h i s
present
on t h i s
of
lecture
observa-
basis;
it
does
intrinsic
breaking.
SU(3) in the
values
metry
(ii)
(8a,b),
(9a,b)
relations.
angle
provided
processes
(i)
SU(3) or
SU(3)
requiring
all
would
is an e a s i e r - t o - t e s t
true
444
are
They
l i m i t of e x a c t
of s c a t t e r i n g
There are
and
occur
consequences
not other more
(4),
of r e l a t i o n s w h i c h is v a l i d
breaking
since
Relations
of s - c h a n n e l
all
of o u r
that
particular
speculative
My o b j e c t i v e
manifestations
be e x a c t l y
the
barrier
This
of S U ( 3 )
kinematic
that many
be well
very
the
do
specula-
together:
increases, and
eventually
through
or
o n l y g o e s up as An s, so
t h a t the
examples
the TTN and
amount?
it a s s u m e s
not follow
do
such
question
a p a r t by a f i x e d
m u s t be c o n s i d e r e d
can
interesting
energy:
conclusion
tions
study
together
should
been
in the
to c o m e
is t h a t e v e n t u a l l y
principally
these
tend
tion
effects
the
infinite
remain
the e n e r g y
is s e e n
to
small, f i x e d m u l t i p l i c i t y
they
multiplicity
than
importance
of class sym-
exotic
exchanges
have vanishing
latter
condition
energy
either
t i o n , the limited enough of
in the f o r w a r d
to t h o s e regions
contributions changes: latter
SU(3) dure the
high-enough
exotic
to an from
from
can
is l i k e l y
has n o t so f a r b e e n literature.
Rather,
examine
t-channel
minimum
energy
any
on
(generally
at
what
proce-
followed
been customary if a b o v e
a few GeV)
and
are
of the f o r w a r d
satisfied.
the r e s u l t s sis
as d i s c u s s e d and
due
these
account
earlier,
I just want
between
difference
elastic
(-t £
is no t i m e tests.
over
(GeV/c
h e r e to Their
amplitudes play very 445
2 ) ) they
discuss
effects,
has
interesting
where
analy-
considerations,
t h a t the s u c c e s s one
to
the
proper
as o t h e r
to m e n t i o n
corrections
0.5
of m a s s - d i f f e r e n c e
as well
it is n o t s u r p r i s i n g
mixed. tion
There
of all
requires
peak
in
some
2 region
ex-
these
This
systematically
see
in
t-channel
to be v a l i d .
to
t-channel
exotic
t the
In
by a d d i n g
then determine
relations
small-
are n e g l i g i b l e .
information
it has
direc-
contributions
relation
of
high
strictly
and
requiring
ranges
the
o n l y at
is
to t r a n s f o r m
experimental
Since
backward
t h a t the
exchanges
processes
and o v e r w h a t
relation
the
energies
s-channel
p r o c e s s e s , one
energies
or
of s u c h r e l a t i o n s
it is p o s s i b l e
relation
section. satisfied
of t or u s u c h
the r e l e v a n t
SU(3)
is g e n e r a l l y
validity
principle,
cross
the
little
mass
role:
been rela-
A (7r + p)
- A(tTp)
+ A(K"p)
= exotic-exchange = 0 (t-channel
- A(K~n)
+ A (K+n)
amplitudes,
relation
and
valid
A(K+p)
-
hence
near
t=0). (16)
This
implies
that
at
incident
energies
above
3 - 4
GeV, aT(ir+p)
with
a similar
parts
of
- cfj(it"p)
+ Oj(K"p)
- aT(K"n)
aj(K+n)
- aT(K+p)
= 0,
relation
the f o r w a r d
holding
(17)
between t h e
amplitudes.
Since
+
real
above
2.5
GeV/c
one
aT(K+p)
= aT(K+n)
,
- Oj(ir+p)
= aT(K"p)
- aT(K"n)
has aT(ir"p)
. (18)
F u r t h e r m o r e , we have a l s o due to the one
seen that w i t h i n
K mass d i f f e r e n c e ,
above
2 - 3
t h e 4 mb GeV/c
has ctt(tt"p)
from which u s i n g
Eq.
= Oy ( K ~ p ) ,
(19a)
(18)
aTU+p)
= ay ( K ~ n )
446
.
(19b)
To e x h i b i t the e x p e r i m e n t a l b e h a v i o r of the left side of Eq. (17) as a f u n c t i o n of i n c i d e n t m o m e n t u m , I have used e x p e r i m e n t a l data as f o l l o w s : (i)
Below 3.5 G e V / c , I have used
precisely.
known t o t a l - c r o s s - s e c t i on d a t a , with a-j- (fr + p) , a-|-(7r~p) 20
taken from the same e x p e r i m e n t
e t c . , to m i n i m i z e
the s y s t e m a t i c errors w h i c h are the m a i n
uncertainty.
I have not used every m e a s u r e d datum but only e n o u g h data to i n d i c a t e the trend. (ii)
A t the h i g h e r m o m e n t a , I have used the
w e l l - e s t a b l i s h e d f e a t u r e that the K ~ p , K~n forward a m p l i t u d e s are a l m o s t c o m p l e t e l y i m a g i n a r y , as is their d i f f e r e n c e , and hence the optical
theorem
c o u p l e d to a c c u r a t e e x p e r i m e n t a l data on the c h a r g e e x c h a n g e r e a c t i o n K"p ->• K°n near the forward
direc-
tion p e r m i t t e d the m o s t p r e c i s e d e t e r m i n a t i o n s of 91 CTy(K~p) - a y { K ~ n ) . I have also taken ctt(K p) = + a-|.(K n) at the higher m o m e n t a . -
+
The r e s u l t s of this are shown in Fig. 12.
The
principal e r r o r s are s y s t e m a t i c , and I e s t i m a t e them to be less than ± 0.5 m b .
Fig. 12 shows that after
some o s c i l l a t i o n , the left side of Eq. (17) goes e s s e n t i a l l y to zero at 3 GeV/c and r e m a i n s there to the h i g h e s t a c c u r a t e l y - m e a s u r e d m o m e n t u m of 12 G e V / c . Below 3 GeV/c, and p a r t i c u l a r l y below 2 G e V / c , the e x o t i c - e x c h a n g e c o n t r i b u t i o n s are substantial i n v a l i d a t e Eq. (17).
and
T h u s , a g a i n , S U ( 3 ) is well
s a t i s f i e d w h e n e v e r the k i n e m a t i c o f f s e t s of m a s s 447
differences cally
either
play l i t t l e
r o l e or are
taken i n t o a c c o u n t v i a a p p r o p r i a t e
and p h a s e - s p a c e
connections.
448
specifi-
barrier
NOTES AND REFERENCES 1.
A recent
fit
couplings
is
Phys. £22, 2.
o f b a r y o n decay w i d t h s given
93
in D.E.
to
SU(3)
P l a n e et a l . ,
Nuc.
(1970).
S . Meshkov et a l . ,
Phys.
Rev. L e t t .
1_3, 212
(1964). 3.
Data f o r Figs.
Fig.
1.
Some o f the data g i v e n
1 and 3 a r e t a k e n from the c o m p i l a t i o n
Meshkov e t a l .
(Ref.
quoted t h e r e i n .
Bacon e t a l . , Reynolds
Dahl
D. M i l l e r
Phys.
Phys.
Rev.
G. London e t a l . ,
J.P.
5.
H. H a r a r i 208
6.
D.F.
Berge et a l . , and H . J .
come
1377
(1965).
( 1 965 ) .
1 431, 1 034 147, 945
Rev.
129,
Rev. 1 4 7 ,
Lykin,
(1967).
(1969).
Rev.
Phys.
(unpublished).
1_40, 360
1824 Rev.
(1968).
Phys.
(1966).
1262 945
Rev.
(1969). (1966).
Lett.
1_3,
(1964). Kane, P h . D .
G. B e r g u n e t a l . , P.M.
181,
Phys.
Thesis,
A. B e r t h o n e t a l . , 7.
are
(1967).
1424
16877
Rev.
Phys.
P.M. Dauber e t a l . ,
1263
Rev. 1 6 3 ,
Phys.
B e r g e et a l . ,
4.
157,
Rev. 184»
e t al . , P h y s .
D. Huwe, P h y s .
J.P.
Rev.
UCRL R e p o r t No.
et a l . ,
of
references:
Phys.
et a l . ,
L. J a c o b s ,
2 ) , and r e f e r e n c e s
O t h e r more r e c e n t d a t a
from the f o l l o w i n g
0.
in
Nuc. Nuc.
Dauber e t a l . ,
UCRL-20682 Phys. £24,
Phys.
Phys. 449
(1971). 417
B8, 447
Rev. 1 7 9 ,
(1970).
(1968). 1262
(1969).
8.
P. Kalbaci
et al . , Phys. Rev. Lett. 2]_, 74
(1971). 9.
S. Meshkov and G. Yodh, Phys. Rev. Lett. TJ3, 474
10.
(1967).
Data for Fig. 6. (ir"p)
Total
cross
sections:
A. Citron et al., Phys. Rev. 1101
144,
(1966).
K. S. Foley et al., Phys. Rev. 1_9 , 330 (K~p)
Lett.
( 1 967).
W. G a l b r a i t h et al., Phys. Rev. B913
138,
(1965).
R.J. Abrams et al., Phys. Rev. Dl_, 1917
(1970).
(K~p ->- TT~Z+ ) J.S. Loos et al., Phys. Rev. 1330
(1968).
D. Birnbaum et al., Phys. 31B, 484 11.
Lett.
(1970).
J.L. Rosver, Phys. Rev. Lett. Z2, 689 H. Harari, Phys. Rev. Lett. 22,
12.
173,
562
(1969).
(1969).
C. Schmid and J.K. Stonow, Nuc. Phys. B2£,
219
(1971 ). 13.
14.
G.E. Kalmus, G. Boneani
and J. Louie,
19777, Phys. Rev. D (in
press).
Data for Fig. 8.
cross
(7T+p)
Total
UCRL-
sections:
A.A. Carter et al., Phys. Rev. 1_68, 1457 (1968).
(K + p)
D.V. Bugg et al., Phys. Rev. 168, (1968) . 450
1466
R.L.
Cool
et a l . ,
Phys.
Rev.
DJ_, 1887
( 1 970) . 15.
16.
Data
for
Fig.
Ref.
10.
For
M. D a v i e r 239
17.
9.
Total
(ir + p
cross
K+E+)
and H. H a r a r i ,
sections--see
see R e f s .
Phys.
Rev.
8 and Lett.
9. 35B,
(1971).
D. C l i n e
et a l . ,
Phys.
Rev.
Lett.
1318
(1969). 18.
A.
Firestone,
19.
A.
Bashian,
20.
Data from R e f .
21.
P. A s t b u r y
Private
Communication.
to be p u b l i s h e d 10,
et a l . ,
(1971).
14. Phys.
( 1 966 ) .
451
Rev.
Lett.
23_, 396
FIGURE 1.
Cross
sections
CAPTIONS
for
the
( 1 236 ), K + £ ~ ( 1 3 8 5 ) , (1530). through
The
solid
Comparison
3.
Predicted
and
using
curve
4.
the
of
[M J
Fig.
Curves
are
from
Comparison
of
Comparison
of
tt+Z~
K~p at
Kane
1.5
GeV/c.
(Ref. .051
and
2).
sections
K~p +
&eff
K°5°
B2 o f
= 1-
cross
Kane
Diagrams
(a
to e x p l a i n
K~p -+ tt"z + of
K"p -»- K ° S °
angular
Curves
from
6). -
n
)
IT" P
Test
(Ref.
2
are
with
IN P
^"E+)]t= Q.
[da/dt(K'p
8.
shown
6).
f i t B 2 of
7.
are
setting
fit
fit
et al.
cross
1 and
K+~~
confusion,
Meshkov
K~p •* tt + e" a n d
sections.
Errors
to m i n i m i z e
from
of
of
distributions
6.
is an e y e b a l l
experimental
Comparison
(Ref. 5.
curve
t h e tt+S ~ ( 1 3 8 5 ) d a t a .
2.
tt+A~
tt~p
K"p ->• tt+E~ ( 1 3 2 5 ),
f o r 7r+£~ ( 1 3 8 5 ) p
only
reactions
the
reality
of
the
forward
amplitude.
the
SU(3)
relation
(9a).
See
text
for
detai1s. 9.
High-energy for
10.
Comparison
Test
relation
(9a).
See
text
of d a / d t
for
K+n
K°p,
K'p ->- K ° n
GeV/c.
Comparison Solid
12.
of
details.
a t 12 11.
test
of b a n d a *
points of
the
for
K~p ->- Tr~Z + , tt p ->• K+ii .
points
-ir + p.
t-channel relation 452
(17).
-K'p, open
(Ref.
19.)
^
2CI3?R)TR
a
Z'(
+
S 7
I 5
" 3 O ) K
+
+
+- A
o.oi
— 0
- I — 1.0
2.0
3.0 MI-.MKNTVM
Fig. 1
453
F S l > / t )
-p O)
qui X 2 ( A s g )
454
1
A V "
I 3 MoMPorruMÍ tfV/t) Fig.
455
3
1.3
2.0
2.2.
2.f
C.M
C:WER6.y f t í - e VJ>
F i g .
456
4
Fig.
457
MoMeK/Ti/M (&e.^/c)
Fig. 6
458
l>v
Ca)
I kT
1
U/ I Kr TT
(M
I
KV Kr i Fig.
7
459
2-
MOMENTUM
Fig.
460
8
C6c*//C.)
No \
MASS J>IFFE«E»;C£CfO-ßfcri^iJ Ù IFFE A F KC LI + MohenTUH Barrier. CcUtEcrioH ÎATA " K*)
\
\
I.C
2.0
iflRRE orifffj
10
5.0
¿0
HjHff-TL'M
Fig.
9
461
1 000 • f
— .ttjis
12
Gsv/c
cxpa(^íN)an+
+
Í2..3
Gey¿
^ s t b u r y , et. a l .
i 00
"V" rû
^
,
lo
i—^ fcn
i
i
i
O.i o. OÜ
0 . 2 5 -
O
t
.50
0 - 7 5
( G e v / c )
Fig.
462
10
2
1 .00
1—1—i 8T 10
80
fi 5
60
.o
1 12
S
1
(GaV)2
1—i i 16 20
1 24
r 30
f
(Q)
î
20-
it -I
10
1
1
1—i—i—i
i
i
12
8
° S Xi
6
i
i
(b)
10 U xi
i
5
{
í
1 6
1
}
5 M f
42 -
J 5
Pjnc
I 8
(GeV/c)
Fig.
463
11
I
L 10
J
14
I
I
L 20
IO MOM£K/T"U M Fig.
464
12
C^V/c)
LECTURE EXPERIMENTAL I.
ASPECTS
OF M U L T I P A R T I C L E
I considered
that
that,
I was
preparing
in l i g h t of the
tion o f N A L , a n y d i s c u s s i o n which
failed
to d e l v e
was unthinkable. s i o n s of
this
as the p r e s e n t a t i o n s
me m a y well
shift
other way
giving
us to o v e r k i l l
some
particular
theoretical
topics
II.
emphasis
than
by
the
this
into a w h o l e I plan
of p a r t i c l e
the
Cross
real
behavior
ISR.
experimental
from
purpose,
any I have
series
of
individual
to s a y
something
status.
Sections
emphasis at very
to b e g i n w i t h
the C E R N
I have
presentation,
to the a c t u a l
present experimental
High-Energy
worthwhile
topic
reappraisal,
intended
For
on e a c h of w h i c h the
as
Conference
of t h i s rather
discus-
Frazer
of the
as f r e e as p o s s i b l e
prejudices.
subject
Since
from
agonizing
to go a h e a d w i t h m y
the
phenomena
by P r o f e s s o r
of m a n y
opera-
interactions
the e x c e l l e n t
consideration
data and remaining
split
imminent
around.
Yet after decided
lectures,
into m u l t i p a r t i c l e
subject given
another
my
of s t r o n g
In v i e w of
attendees,
about
PHENOMENA
Introduction A t the t i m e
well
IV
is the high
understanding
energy,
it
recent cross-section
By a p p r o p r i a t e
465
seems results
normalization
and
extrapolation
of the
ing d a t a of H o l d e r section
sma11-ang1e
et a l j
at a l a b o r a t o r y
to be 6 . 8 ± 0.6 m b . tainties,
of 30 G e V .
the
direction
forward
theorem, Holder l i m i t on the
where mb.
"a"
t.0
= °-051
f and
From
the
quoted uncer-
typical
values
of the
to
optical
set a useful
°lot [ 1
all
cross
(jfU
a2]
(1)
>
sections
from
1 7 2
+
(1)
are
in
that
(77-2) I t* a
•
(2)
. = VtU.O ( 4 0 . 3 X± C. 2.0) \J) MIL! mb ( — 7J) 1 + a
.
(3a)
the e x p e r i m e n t a.
is
section:
it f o l l o w s
°tot = t o r k r
cross
the e x t r a p o l a t i o n
can further
pp c r o s s
small
from
and a p p l i c a t i o n
total
a = R£ f / I m For
figure, given
From
et a l J
pp
of 500 GeV
is n o t v e r y d i f f e r e n t
at e n e r g i e s
elastic-scatter-
the e l a s t i c
energy
This
pp
then
z o z
Hence
°tot with
the e q u a l i t y
NA
M CJ3 wO- c o •I—
+J , LO IO
o -t-> ~0 1— to a 4-> ) to C i—
1 T/1
c -i- c: o
O LO •R- 0)
Q- XI t/1 +-> So o a. i. >> s. -e ai.
529
•
r— OO •
4— a:
— , •
OJ •
Ol •r— Lu
Fig. 13-
Jt+jt
anomaly at KK threshold.
530
« 99 t^INTS * l< e* G*» -'
a) i
n
rU
1 L
J
1 1 ijlj:
»
, ! , ! |'i '111 !• M | li
.I"'!
'III
Si;' Hi
« i
i !l illl- i
¡"'ii!
ii ,|1 !
i '!,
•1
!
li'^'li Ì d)
¡i y! ! ij
¡1
'«,
^illjll!
Variation of the Legendre polynomial coefficients for the v*it and v u® s y s tems as a function of the dipion mass. The corresponding mass spectra are shown on top of each figure (3.9].
(n*ti*) EPF MASS . Gev Variation of the Legendre polynomial coefficients for theJT + ff° system in the reaction v p — pjr + jr° at 8 GeV/c. aB a function of the dipion m a s s . The condition | £ 0.4 GeV 2 has been imposed.
Fig.
14.
Properties
of
531
j«t
systems.2^
*!„•„-
(G*V/c z )
Dipion m a s s distribution of observed events with | % 0.3
to 0.4 G e V / c ,
off very
qA
fits).
momenta:
(compatible The
average
and
on
t y p e of p a r t i c l e
or m u l t i p l i c i t y
produced.
average
particles. particles (Jones,
more
The from
logarithmic
slowly
available
1970)
of
strongly particles
et al . ( 1 9 6 9 )
of p a r t i c l e s
n u m b e r of p a r t i c l e s
of the
independent
or
(1968) .
Low m u l t i p l i c i t y
energy--much
expo-
value,
not depend
S e e , f o r example, S m i t h
E l b e r t et al. 2)
does
number
with
with
is a p p r o x i m a t e l y
incident energy,
the
The
rapidly
of the
most
REACTIONS
data the
shown
produced
than w o u l d
energy
were
produced:
grows be the
converted
on the m u l t i p l i c i t y
Echo
Lake
in Fig.
increase with
cosmic
ray
1 are well
energy,
of
The
slowly case
with
if
into charged
experiment f i t by a
*
*
T h i s is the fit of W r o b l e v s k i ( 1 9 7 0 ) . J o n e s et al. ( 1 9 7 0 ) , in o r d e r to a c h i e v e a b e t t e r s i m u l t a n e o u s f i t to a c c e l e r a t o r a n d c o s m i c ray d a t a , use n c = A £ n Q + B, w h e r e A = 1 . 4 1 ± 0 . 2 0 , B = 2 . 0 4 ± 0 . 1 9 , a n d Q = /s - 2m .
538
nc We
shall
= 0 . 8 7 An
return
later
t i o n of m u l t i p l i c i t y we are m a i n l y
concerned
with
of p a r t i c l e s
less
rapidly
than
This
fact,
energy
the
momenta,
goes
into
longitudinal
produced
the
implies
descrip-
b u t at the
moment
that
the
is g r o w i n g
energy would
rule
of small ne s s of
motion,
increases
much allow.
t h a t m o s t of the
longitudinal
momentum
(2.1)
detailed
observing
available
together with
+ 1.4 .
to a m o r e
distributions,
multiplicity
transverse
(Elab/mp)
available
a n d the
rapidly
with
average incident
energy, (2.2) Figure
constant
cross
longitudinal change
the e l o n g a t i o n
2 sketches
section
momenta
rapidly
with
simplifications
in q„ of a c o n t o u r
as s i n c r e a s e s .
are
the o n l y
energy,
variables
and g r e a t
can be o b t a i n e d
Thus
the which
kinematical
by r e c o g n i z i n g
this
fact. II.B.
Longitudinal The
kinematics
generally result,
Kinematics
quite
involved.
however,
scattering.
of a m a n y - p a r t i c l e
The
in the
region
final-state
scattering
processes
transverse
momenta
p e n d e n t of the
Great
K
are
high
particles
of
characterized
energy
539
as
is
simplifications
of v e r y
0.4 G e V / c ) ,
incident
system
which the
energy
such
by small
mean
become
inde-
latter
becomes
of
large.
This
suggests
longitudinal scattering
and
a differential
transverse
amplitude.
of a f i n a l - s t a t e represented
That
particle,
treatment
momentum is,
for
the
of
the
dependence
if q is the
it can be
4-momentum
conveniently
as: q = (E, cjj. , q „ ) ,
E = (q? + y 2 ) 1 / 2 ,
where the
rest mass
of the
times
referred
times
as the
the
transverse
in the
reduces
essentially
(m2
particle
to as
happens
space,
y =
+ q^)
longitudinal mass!).
to one
1 7 2
,
and m is
in q u e s t i o n ; mass
If one
transverse-momentum
and y becomes
(2.3)
the e f f e c t i v e
some-
(and
some-
ignores
plane,
dimension
y is
in
the
what
problem
ordinary
mass
(for a
given
IqJ). The
separation
transverse
parts
of q i n t o
is c l e a r l y
of h o m o g e n e o u s
Lorentz
a boost
longitudinal
about
in the
the
same
formations Under are
varies,
picture
one
(Benecke,
direction, call
Lorentz the
however,
favors.
1 970),
as a d i f f r a c t i v e
frame
according
picturing
such
540
subset
includes
and a
rotation
trans-
Chou,
momenta
discussion.
The
longitudinal to the Yang,
mu 1 t i p a r t i c l e
fragmentation
the
that
transverse
f o r the
Benecke,
under
and
transformations.
a n d n e e d no f u r t h e r
of a r e f e r e n c e
momenta
covariant
We shall
transformations
invariant,
longitudinal
transformations
longitudinal
these
choice
axis.
its
of the
physical and
Yen
production
projectile
and
target,
f a v o r the r e s t frames of t h e s e
Feynman ( 1 9 6 9 ) , strahlung parton,
picturing
resulting
prefers
it
eliminates
model p r e f e r s
i n the parameter
Lorentz
the b i a s
imposed on the data
(1970).
C o n s i d e r the
process
frame.
pa + pb is
outgoing
This 1963),
is
particle,
outgoing p a r t i c l e s .
is
defined
yi
v a r i a b l e was and has Van Hove
(2.4)
p
a
is
the
the four-momentum of the
and X r e p r e s e n t s Specialize
target i
th
the r e s t of
to the
momentum (CM) frame, p a + p b = 0. y.
which
q 1 + X,
the beam four-momentum,
four-momentum, q
evenly
presentation
been employed by Feynman ( 1 9 6 9 ) , and DeTar
where p.
special
transformation.
used by W i l s o n i n 1963 ( W i l s o n ,
(1970),
low
specifying
one e l e g a n t c h o i c e of v a r i a b l e
by c h o i c e of a p a r t i c u l a r
recently
no
p r o d u c t i o n of p a r t i c l e s
spaced (on the a v e r a g e )
There i s
i n which
p r o d u c t s would have r e l a t i v e l y
implies
the l o n g i t u d i n a l
by brems-
from change of d i r e c t i o n of a
The m u l t i p e r i p h e r a l
frame, s i n c e
production
the c e n t e r of mass s y s t e m ,
the b r e m s s t r a h l u n g energy.
particle
particles.
the
center-of-
Then the
rapidity
as
= sinh"
i (q„/pi )
where the l o n g i t u d i n a l
, mass y• i s d e f i n e d
541
as
(2.5)
Pi q^1, is
and where
the
system.
Often
there
is
no
being
considered.
q1
so
the
one
(rn?
q1
=
can
In in
(p.
|qi|
+
2
longitudinal
confusion
four-momentum
where
=
drop
terms
of
has
the
qj,
(2.6)
final
system
cosh y.,
, in
superscript
which
CM
1 / 2
momentum
about
the
z-direction
the
)
i
q^,
given
y.
been
chosen
(qj,
qj).
CM
when
particle
rapidity is
the
y^
is
the
by
sinh y.), along
(2.7)
the
beam,
that q]
The
rapidity
y^
transformation in w h i c h
equal
specifies that
particle
All
by
i has
the
are
all
related
That
is,
a longitudinal
terized
by y = c o s h u
y\
+
momentum
by
lab
frames
t h e y^
a simple Lorentz
merely
frame
Lorentz to
longitudinal
moving of
(2.8)
longitudinal
the
zero
use
they
The
the
relates
longitudinally
footing
= y.,-
=
the
momentum.
are
put
on
variables,
shift
of
y.
the
to yj
an
since scale.
transformation
changes
frame
charac-
where
u. kinematic
limits
conservation
Expressing
q1
in t e r m s
on y
follow
from
the
energy-
relations N 1 £ q„ = 0 , i=1
(2.9a)
N i Z ql = A . 0 1=1
(2.9b)
of y .
542
through
Eq.
(2.7),
and
then adding
and
subtracting
N Z i=l from which
y . 1
u.e 1
'
it f o l l o w s
Eqs.
N Z i=l
=
(2.9), one
finds
-y. 1
u.e
= /s,
1
(2.10)
that Y
4
i
incident
in Eq.
Pab(q„.qi.s) f o r the
ap(0)
f
still
less
divided
approach
a
by
than the
constant
*
T h i s w o b b l y f o u n d a t i o n u n d e r l i e s all the p r e d i c t i o n s which follow. A l t h o u g h the e n e r g y d e p e n d e n c e w o u l d be m o d i f i e d by l o g a r i t h m s if b r a n c h p o i n t s a r e i m p o r t a n t , this e f f e c t w o u l d be h a r d to d e t e c t . Factoriz a t i o n is e a s i e r to t e s t , a n d s h o u l d be t e s t e d as a c c u r a t e l y as p o s s i b l e . It s h o u l d be r e m e m b e r e d , however, that w h e r e a s a b r e a k d o w n of f a c t o r i z a t i o n i m p l i e s n o n - p o l e t e r m s , the c o n v e r s e is n o t t r u e . ** T h a t the R e g g e s i n g u l a r i t i e s w h i c h g o v e r n the a s y m p t o t i c b e h a v i o r of A are the s a m e as t h o s e w h i c h g o v e r n the a s y m p t o t i c b e h a v i o r of t w o - b o d y r e a c t i o n s is a p l a u s i b l e , b u t u n p r o v e d , h y p o t h e s i s . 555
as s
. Another
prediction
central,
double-Regge
spectrum
f ^ ^ )
This
is
is e q u i v a l e n t
plateau from
in the
of
region
(2.43)
the
independent to the
rapidity
analysis
model
recovers
all
particle
spectra.
Mueller Regge
predictions *
analysis.
poles,
If the
where
a b
B, is the P o m e r o n
w h e r e Y-jiq.,.) is now of the the
(
process!
particle
determine cr . , one
produced.
the m a g n i t u d e can w r i t e
0
the
Sec.
model
become
e
=
a6b
coupling
Since
resulted II.E.).
for
apparent
pre-
from
the
singularities
are
so
that (2.44)
^(qx). to p a r t i c l e
that
total
universal
Thus
single-
a,
and
independent
can d e p e n d
the c o u p l i n g s
of the
s.
central
function,
however,
the
as of
general
is e x p e c t e d ,
a universal
Note,
as well of a
the
leading
factorization f
of q H
(see
of the m u l t i p e r i p h e r a l
in
single-particle
prediction
dictions
Additional
is t h a t
variable y, which
the m u l t i p e r i p h e r a l
the M u e l l e r
Eq.
cross
6a
on
and
section
relation
(2.45) i ndependent Remember,
of w h i c h
however,
sufficiently
high
particles
t h a t this energies
a and
relation
to p e r m i t
b are
incident.
holds both
s
only . and
for s.
T h e s e i d e a s can be, a n d h a v e b e e n , d e d u c e d f r o m the mul t i p e r i p h e r a l p i c t u r e . In p a r t i c u l a r , W i l s o n has e m p h a s i z e d the c o n n e c t i o n b e t w e e n s h o r t - r a n g e o r d e r and factorization (Wilson, 1970). 556
to be
large. Fragmentation
limit
sbl-
sai
regions; fixed,
target-fragmentation s
• i n the lab a1 sai
single-Regge
s ->•
region.
limit:
and qA f i x e d To see t h i s ,
The
is
the
evaluate
frame,
= 2 p a • q ^ = 2m a V(q®) 2 + q 2 + m 2 .
Hence f i x e d
s^
(2.46)
and f i x e d q A imply f i x e d q^
(lab
frame). To e v a l u a t e will
the Regge l i m i t
be c o n v e n i e n t
the r a p i d i t y plot.
y.
to c o n s i d e r A a b
sai
the d i s t a n c e s
and s b i
these d i s t a n c e s ,
(2.37)
region,
dependence of A a b on s b i
= s and
b
the
related
is
qj.
proportional
to
plot,
In
where s b - -+ 00,
it
of the
the a
b
(0)
to sbl-
,
(2.37b),
ak o i l -(^Y+yia. b = [M2exp(lY-y4Y+y)] b e 2
ah(0)
that
to r e g a r d A a b as a f u n c t i o n
target-fragmentation
of
rapidity
are a s y m p t o t i c a l l y
Aflb(-^-Y + y , -jY - y ,
it
as a f u n c t i o n
from the ends of t h e r a p i d i t y
i s most c o n v e n i e n t
or u s i n g Eq.
region,
and the l e n g t h Y.. of the
S i n c e we have seen i n Eq.
invariant
in t h i s
%
_ , f^^Y+y.qJ
,
fab(|-Y+y,q1) ,
(2.47)
therefore 557
p
a
,1 b ( r
+
1 y - r - y ' 0
ou(0)-l =
^
,
s
W
r
^
o
.
(2.48) If
the Pomeron dominates and i f a p (0) = 1, then we
f i n d t h a t the d i s t r i b u t i o n
is
as s-» 1 ».
limiting
It
depends o n l y on q A and ^-Y+y, which are e q u i v a l e n t
to
q x and q^, the lab momenta. From F i g . that a l l
11a we see t h a t f a c t o r i z a t i o n
the dependence on the beam p a r t i c l e
contained in a f a c t o r f
Dividing
ab(I
Y +
f u n c t i o n which i s
is
so t h a t we can w r i t e =
y'^
by the t o t a l
implies
e
b Ya(^+y,qi).
cross
(2.49)
s e c t i o n , one o b t a i n s a
i n d e p e n d e n t of the n a t u r e of
the
beam: E
da .
,
=
(2.50)
ab d q Similar
results
r e g i o n where s a i - i s corresponds jectile
h o l d i n the
l a r g e and s b l - f i x e d .
This
to f i x e d ^-Y-y, or f i x e d q„ i n the
r e s t frame
(which we d e s i g n a t e as q ^ ) ,
has the s i n g l e - R e g g e the
beam-fragmentation
l i m i t shown i n F i g .
lib,
proand giving
result otp (0 ) - 1 Pab(q„.qiSs)
Factorization
then i m p l i e s fabtqj.qi)
Finally,
f
= s
-I a b
(
r-
y
'
q
^-
(2
-51)
that =
Yb(^Y-y,qJ.
one can d i v i d e by the t o t a l
cross
(2.52) section
o b t a i n a f u n c t i o n which i s 558 i n d e p e n d e n t of the
to
nature
of the
target,
1*7 ab d q Approach including analysis
secondary one
asymptotic example,
to l i m i t ;
secondary
trajectories
can d i s c u s s
limit
in the
inclusion
(2.53)
(Chan,
the
trajectories: in the
Mueller
r a t e of a p p r o a c h
1971; Abarbanel,
target-fragmentation
of a s e c o n d a r y
trajectory
to
the
1971).
region aM
By
For
the
would
give
an
e x p r e s s i on / Pab(q„,qliS)
d i fabP(qi.qL)
=
+ s
ct M, M (0)-l, M f ab (2.54)
Secondary
trajectories
differences
can
be i s o l a t e d
of s i n g l e - p a r t i c l e
the
difference
the
p.
between
If p ± ( q , , , q 1 , s )
fragmentation
spectra
taking
for
example,
tt+ a n d tt" on p r o t o n s
isolates
describe of the
tt4 + p
spectra;
by
the
target-
reactions c + X,
(2.55)
then p+(qi,q1.s)
- p~(q^>qj.s]
= 2 fp(qi,qi) An duality their
interesting arguments
limiting
For e x a m p l e ,
speculation
to p r e d i c t
values
(2.56)
S™P is
the e x t e n s i o n
reactions
at l o w e r
energies
K + + p -»• ir + X is r e l a t e d
559
which
attain
(Chan, in
of
1971).
Mueller's
analysis K+
to the
+ p + t:
numbers.
This
Using
reactions, the
one
secondary
Such
same
meson
has
than
reasoning
then
+ p
show
limiting
and non-exotic
exotic, ment
and
of w h a t
Chan
to me.
Perhaps
question
same
before
concensus.
received
also.
subject,
as
the
theorists
of C h a n
data et
et al . ( 1 9 7 1 ) that abc
it w i t h of
will
the
require-
recent ...)
not
settle
are a b l e
clear
the
to r e a c h
consistent
with
a the
al.
discussed
of e x p e r i m e n t a l
target-fragmentation
be
Paige,
it is still
are
+ X
recently
t e s t of f a c t o r i z a t i o n :
predictions
a measure
has
C h e n and
but
T T + X p
A flurry
the e x p e r i m e n t s
Experimental factorization
Ellis
Lipkin;
Available
abc c r i t e r i o n
is e x o t i c
one.
+
+ p
supplementing
(Virasoro;
the
are a
+
et al. c r i t e r i o n
propose
address
the
p
t h a t ab be e x o t i c
preprints
at
tT + X
T T + p
TT± + X
the
Here
+
a controversial
criticize
behavior
reactions,
K" + p
+ T T + X
The q u e s t i o n become
= 0.
Non-Exoti c
-
+ P
fM
of
et al .:
+
P
two-body
channels.
TT* + X
T T + P
in
vanishes,
Exoti c K+
as
quantum
t h a t the c o n t r i b u t i o n s
non-exotic
of e x o t i c
defi ned by C h a n
exotic
trajectories
should
energies
few e x a m p l e s
reaction
the
K + + p + TT* -+
reaction
can c o n c l u d e
reactions
lower
three-body
region 560
above
One of has
already
confirmation.
(the
region
of
the
In
small
laboratory t h a t the section
momenta
qj;) the
prediction
inclusive spectrum is i n d e p e n d e n t
beam-particle
divided
of Eq.
by the
(2.50)
total
of the b e a m m o m e n t u m
or
is
cross
the
type:
C2-S7) where y. depends
on the
a
the b e a m . boration
77 p ->
P P IT p
->-
same
+ X
at
12..7
(b)
77
+ X
at
28., 5
(c)
77
+ X
at
24..8
(d)
+ X
at
24..8
(e)
(a) to
observed
Eq.
are
high enough.
The
agreement
this
exotic, whereas
variety
of
state,
they
their
results.
three
good,
interesting
C h a n et a l .
predict
reactions
as
and therefore limit more
to h a v e m o r e
561
and
energies
It is
its a s y m p t o t i c
energies.
target
(c) is q u i t e
less w e l l .
interesting
same
shows
(a) to
first
(a)
t h a t the
(d) is n o n - e x o t i c
to a p p r o a c h be v e r y
the
final
(2.12)
is j u s t w h a t
by r e g a r d i n g
the
provided
for reactions
to n o t e
a greater
in the
Figure
(d) a g r e e s
that
7 GeV/c
(d) h a v e
(2.57),
but reaction
It will
the
77
77
obey
expected
d a t a on
at
particle
(1971)
collected
+ X
reactions
should
has
colla-
77
+
77 p
Since
1971)
on
reactions:
+
K+P
but not
A Brookhaven-Rochester-Wisconsin (Chen,
following
t y p e of t a r g e t ,
such
is slowly.
data
at
In Fig. the
region
malized
(2.13)
the
of q„ < 0 . 5
by the
total
•1
dependence GeV/c;
cross
on q A
again
section
is s h o w n
the
spectra
agree
quite
for
norwell, 2
especially The good
the t h r e e
following
table
the a g r e e m e n t Table
2.1:
particle GeV/c.
exotic
second
inclusive
sections
shows
at small
quantitatively
q±. how
is:
The
The
reactions
third
divided
column
cross column
gives
section shows
by t h e i r
the
single-
f o r q|j < 0 . 5
these
cross
asymptotic
total
cross
sections. 0.5 da
R e a c t i on
,
dq
l
tot
0
II.E.
0.23 ±
.02
(b)
3.5 ± 0.4
0.20
±
.02
(c)
9.1
± 0.6
0.23 ±
.02
(d)
7.9 ± 0.6
0.32 ±
.02
Short-range
examined
Correlation
Correlation-length about
inclusive
can be d e r i v e d
hypothesis
momenta.
spectra
order
the
t h a t we
inclusive intuitively 562
in
first
of the m u l t i p e r i p h e r a l
general,
M o s t of
from y e t another
(1963) was
single-particle rather
Hypothesis
hypothesis:
of s h o r t - r a n g e
Wilson
predictions
on
0
5 . 3 ± 0.4
predictions
the
do . dqT L
(a)
1.
the
0.5
1
simple
have
viewpoint,
longitudinal to
model
spectra
the
see
that
the
concerning
depended
only
hypotheses:
(a)
l i m i t e d t r a n s v e r s e momenta, and (b)
order in l o n g i t u d i n a l Wilson
(1970)
fully.
momenta.
short-range
DeTar ( 1 9 7 1 )
and
observation
more
have e x p l o r e d t h i s
A l t h o u g h i t has been a b s t r a c t e d from
multiperipheral successful
predictions,
model and i s specific
models and i n c l u d e s it
all
their
most
i s more genera 1 than any
therefore presented here.
multiperipheral
specific
Discussion
models can be found i n
of
Sec.
Ill.A. S i n c e the t r a n s v e r s e momenta are l i m i t e d to v a l u e s , we s h a l l
i g n o r e them and s h a l l
b e f o r e on the d i s t r i b u t i o n s iently, 2
m
,
+
concentrate
as
i n qM o r , more c o n v e n -
i n the r a p i d i t y y = s i n h
-1
( q M / y ) where y
2
2
The c o r r e l a t i o n - l e n g t h there i s
no c o r r e l a t i o n
rapidities
states
between p a r t i c l e s
length L, that i s ,
Moreover,
there
particles
as l o n g as y i s
is
for
no c o r r e l a t i o n
the p l o t by a d i s t a n c e rapidities
hypothesis
that
whose
y^ are s e p a r a t e d by more than a c e r t a i n
correlation
ly.-yJ ' J w i t h the
incident
l a r g e compared to L.
particle will
the p r o j e c t i l e
>> L.
s e p a r a t e d from the ends
d e f i n e d i n the C.M. frame,
the o u t g o i n g
this
means
have no c o r r e l a t i o n
as l o n g as ^-Y-y >> L, and w i l l
now show t h a t a l l
encountered p r e v i o u s l y
the p r e d i c t i o n s f o l l o w from t h i s 563
of
With that
with have
no c o r r e l a t i o n w i t h the t a r g e t f o r |-Y+y >> L. shall
small
We
we have correlation-
length
hypothesis.
C o n s i d e r the h y p o t h e t i c a l trum shown i n F i g . regions:
14.
It
is
single-particle divided into
three
Region T, the t a r g e t f r a g m e n t a t i o n
where |-Y-y < L ; Region C, the c e n t r a l
fragmentation
Consider f i r s t
region.
the
q L , ^-Y-y, and j Y + y .
region,
spectrum
which we take to be
But i n the t a r g e t
fragmentation
r e g i o n JrY-y >> L, so dependence on t h i s would v i o l a t e
where
target-
The s i n g l e - p a r t i c l e
depends on o n l y t h r e e v a r i a b l e s ,
region,
region,
j Y - y , yY+y >> L ; and the b e a m - f r a g m e n t a t i o n where |-Y-y < L.
spec-
the c o r r e l a t i o n - l e n g t h
variable
hypothesis.
Therefore,
That i s ,
the d i s t r i b u t i o n
is
t h e r e can be no c o r r e l a t i o n (except for a normalizing bution reduces
Mueller
Moreover,
w i t h the beam p a r t i c l e
factor),
so the
distri-
to
for which i s
limiting.
| j Y - y | >> L,
the same as Eq.
(2.49)
(2.59)
a r r i v e d at by the
analysis.
I n the b e a m - f r a g m e n t a t i o n ing r e s u l t
is
564
r e g i o n the
correspond-
P a b ^ ' ^ - y ^ x ) for which
is the
same
large
compared
pendent of
|^Y+y|
as Eq.
In the c e n t r a l
= ea
>> L,
(2.60)
(2.52).
region,
to L, so
Yb(^Y-y>qi)
the
b o t h |-Y+y a n d ^-Y-y are spectrum
must
be
inde-
both,
f o r j-Y+y >> L, J-Y-y >> L, which
agrees
porates simply
the
with
a particle
Speculations
At w h a t
energies
valid?
Assume
existence there
that Y =
are
distinct
region,
is s h o r t e r
distribution
than
Y < L: one
is no w h e r e
L in the energy
ends.
energies:
forms
be the
variable
regions
y.
(recall
as the e n e r g y
at the o p p o s i t e
In this
region length,
the so
the
limiting. energy
is s u c h
w i t h y n e a r one e n d of the those
asymptotic
correlation
Limiting-fragmentation As s o o n
both
of s p e c u l a t i o n
length
is
i.n(s/y 2 )):
Low-energy y-plot
arises
region
from
asymptotic
the p u r p o s e
several
away
incor-
which
central
length
these
of a u n i v e r s a l
equation
prediction,
concerning
should
for
This
in the
than a correlation
2.
Then
(2.45).
central-piateau
because
farther
Eq.
(2.61)
end.
region,
t h a t Y >>
spectrum Hence
565
L,
Y >>
particles
decouple
the
L:
from
distribution
b e c o m e s limiting near the e n d s , and the l i m i t i n g portion s p r e a d s as the e n e r g y
increases.
Plateau e n e r g y r e g i o n , Y >> 2L:
As soon as
Y >> 2L, the e n t i r e d i s t r i b u t i o n is e x p e c t e d to take its limiting form.
Every value of y is now at a
d i s t a n c e large c o m p a r e d to L from at least one end. As Y b e c o m e s large c o m p a r e d to 2L, the central
plateau
As Y i n c r e a s e s f u r t h e r , the only
should d e v e l o p .
e x p e c t e d c h a n g e in the s i n g l e - p a r t i c l e
inclusive
s p e c t r u m is that the central p l a t e a u l e n g t h e n s .
In
this region the m u l t i p l i c i t y should i n c r e a s e like An(s ). A.
Y
Since s = e , d o u b l i n g Y means s q u a r i n g s. is, if s^ is the t h r e s h o l d of the l i m i t i n g
That
fragmenta-
tion r e g i o n , and if ? Sp is the t h r e s h o l d of the p l a t e a u r e g i o n , then Sp s^. Which of these e n e r g y regions are reached by current experiments?
The e v i d e n c e on limiting
distri-
b u t i o n s p r e s e n t e d above shows that the r e a c t i o n pp -»• ttX is in the l i m i t i n g - f r a g m e n t a t i o n 13 GeV (see Figs. 6 and 7).
region at
The f a c t o r i z a t i o n
p r e d i e t i o n s which are e x p e c t e d to hold in this region are tested in Fig. 12 and Fig. 13.
It seems likely
that many r e a c t i o n s have reached the l i m i t i n g f r a g m e n t a t i o n region at e n e r g i e s of 10 to 30 G e V , or p e r h a p s even lower in some cases. T h e o r e t i c a l a r g u m e n t s based on the M u e l l e r 566
approach length
(Abarbanel,
around
energy
for
following
a
correlation
In t h a t c a s e ,
could
the
be e x p e c t e d
relation
between
= 350 M e V ,
to
Y and
fragbegin
beam
is s h o w n
1 .5
3.9
30
220
600
3
4
6
8
9
fragmentation
in
the
GeV.
It m a y
to see
the p l a t e a u any
be n e c e s s a r y
1900(ISR) 10.1
limits
at 2 - 4 G e V , a n d p l a t e a u
30-200
existing
2.
of q A
2 suggests
approached
Has
suggest
table:
lab
L £
The
pions
Y Thus
£
region
Y = 3-4.
energy,
E
- o^)-1
L = (1
mentation
1971)
being
appearing
to go to
between
ISR
energies
clearly.
reaction
reached
experiments?
Some
the p l a t e a u
rapidity
plots
region
in
compiled *
by the B N L - R o c h e s t e r - W i s c o n s i n shown
in
rounding plateau shown,
Fig.
at the
E £
pointed The nection
30 G e V ,
Bali,
Brown,
the
there
this
real
of the
Pignotti
energy
plateau
( 1 970)
idea.
by Bali
et al.
single-particle
first discussed
communication,
increasing is no
threshold
Peccei , and
of the x - v a r i a b l e .
Private
can see
are
it be t h a t the h i g h e s t
is at the
test proposed between
one
energies,
Could
o u t a t e s t of
multiplicity
a
Although
higher
apparent.
region?
terms
15.
collaboration
by
From
the
the
spectrum
Feynman
L. L. W a n g 567
uses
and
(1969)
definition a n d T.
conthe
in of
Ferbel.
the
multiplicity follows
and
type
the
n^
is
dq^
the
i, a n d
ck
dy
is
the
over
which
is
equal
to
usually - a
•] .
momenta,
p^q^.y)
average
collisions
a
the
the
Performing one
can
The
tribution
plateau
plateau
1
Thus
the
1
c.
plicity.
Ans
From
be
dy
+ of
the
= n.
in
the
for
cross
section,
over
of
all
defined.
It
transverse
a
Eq.
(2.63)
r
(2.63)
the
plateau
to
with the
const,
region.
the
The
with
Y.
energy,
1
dCT
is
since
this
given
i
a y
and
latter
Explicitly,
1 = — i
con-
regions,
multiplicity
c,
two
a constant
logarithmically grows
gives
fragmentation
•
(2.64)
in y
determines
logarithmic
term
in
the
multi-
off
the
height
in
pp
tt"X a t
whereas
a.
n
is
can
read
28.5
about
30
by
plateau
plateau
15 w e
compared
particles
is
GeV/c mb.
i ne i to
of
n^
integral
Fig.
plateau mb,
from
length
of
(2.62)
section
average
the
from
grows
height
coefficient
the
it
a.,
multiplicity:
contribution
n. =
cross
inelastic
over y the
coming
contribution
10
to
contribution
the
spectrum
write
integral
contributions
= ni
multiplicity
total
' ^
a
single-particle
that |
where
of
to
be
Thus
the
of
about c
%
1/3,
Ti-
with the r e s u l t c . = c + = 0.36, 7T 7T 568
(2.65)
inferred data
by
(see
data,
Fig.
with
sive.
Bali
et al.
1).
Bali
similar
for
the
pp
ir'X, a n d
this
energy
the
will
change
only
There at
ratio
should
that
as
fact
unity
be
pp -»• tt~X is is
is
energy
is
it
not.
in
of
at
the
This
is
the
the
us
30
plateau suggested
by
30 G e V
the
p -»- tt+ e v e n t s
at x = 0, w h e r e a s
the
pp
tt"X e v e n t s
type
shown
Perhaps
mostly
at
of
3.
the
Two-particle
inclusive
spectra
information. spectra length
central
by
Many
the
analysis
particle
inclusive
in
a source
predictions
Mueller of
be
this
1 °
as
r
d
q i
It
the
could whereas
fact
that
than
dominate,
p -> it". even
at x = 0
Fig.
are
10.
Two-particle
by
additional
about the
Define
these
correlation-
the
r-
follows:
da 3
this
region,
made
and
section.
spectrum
that
of much
are
analysis
7t+/tt"
the
stronger
correlations:
will
plateau.
threshold,
tt+ is m u c h
fragmentation
above
spectrum
GeV.
p
the
reaction
in
plateau
2 at
the
central
tells
ray
impres-
increased
however,
is a r o u n d
is
at
inclusive
the
cosmic
additional
indeed for
Factorization
equal
Lake
agreement
region
a discrepancy,
x = 0.
tt+X
The
by e x p a n s i o n
in
pp
the
Echo
analyzed
single-particle
whereas that
al.
30 G e V
plateau
that
is
ratio
et
the
results.
It s u g g e s t s
threshold
from
~
1
da
0
r dy. 1 n i =i
d
2
q. 1
j.
(2.66) 569
where
I have
adopted
for discussion differs
from
a normalization
of c o r r e l a t i o n s .
Note
the s i n g l e - p a r t i c l e
the
remainder
of t h e s e
The
normalization
notes
is s u c h
3 d
more
convenient
that
spectrum
p ^ p used
by a f a c t o r a , p = crp ^
3
q
d
l
q
n is the n u m b e r Consider
y2>q2)-
If
hypothesis into
the
Note
r
( r ) /-*
- »
' ^J-' each other
>:>
^-.y^l
p
ab
that
) ( y
the
spectrum
|yry2|
the
resulting t
^
should
in y - s p a c e ,
fragmentation
region.
in Eq.
spectrum t w 0
ab
each
correlation degenerate
spectra,
in
is
T h e n we
l
U
; y
a r e
is the
can use
to o b t a i n
5 q
independent
the
+
N
q
2^
2'
is a l s o
in the
far
target-
beamEqs.
(2.50)
result
= Y a (^"Y+y -J > Q -J j. ) Y b 4 Y - y 2 , q 2 l ) . 570
of
fro"1
of t h e m
S u p p o s e y^
and y 2
( y
is
Particles
then
(2.68)
;
(2.68)
(2)/ p
(y-j
>> L.
'ie
region
p ^
P Ì ^ ^ ' V ^
Y )
l'V'
l e a s t one e n d .
(2.53)
spectrum
L » the s h o r t - r a n g e
for
B u t
(2.67)
produced.
of s i n g l e - p a r t i c l e
fragmentation
and
of p a r t i c l e s
two-particle
product
that
from at
the
says
=
.
that
= , where
in
(2.69)
If t h e
energy
is
y^
in
central-piateau
are
even
the
further
where
y(qA)
prediction According earlier, Eq.
able
(
l ' ^ l
y
to
defined
the
easily
region,
b o t h y-j
degenerates
=
Y(qZx).
(2.70)
by
Eq.
(2.45).
This
so
rough
energy
speculations
E £
high
GeV.
The
requires
only
that
region, at
that
be m e a s u r e d
which
13 G e V .
both
we
3L.
made
prediction Y >>
L,
seems
to
It is
a
Ya(q±>y)
independently
latter
t h a t Y >>
600
scattering in
and
this
energy
however,
prediction,
that
an
implies
in pp
high
prediction
fragmentation
particle
and
from
none
of
these
investigation
of
the
function,
if
defined p -
the
be remark-
Y b ^ the
1
still
short-range
will
be
Mueller
p
( 1 )
be
predictions
two-particle
are
correct,
correlation
as
(2) / ->% (y!»q11;y2'q2i;s) (yrq
l A
p(2)(y2»q2x's)
>s)
very
interesting
correlation
to
e
method
us
that
cuts
tells et
or an
al.
and
(2.71)
important.
hypothesis predicts -|y2-y1I/l
proportional
Freedman Regge
' ^
single-
= g ^ ( y i » q ^ ^ » ^ - ^ ' will
in
spectra.
Even the
)
the
requires
this
limiting
can
is
(2.69),
reached
into
a b
p
sufficiently
, and
(1971)
L =
(1
discuss
M i- 0 P o m e r o n 571
(M
is
the
that
again
- c^)-1 the
The
%
(2) gx
the 2.
effect Toller
of
quantum
number).
bution which Lq o f the II.F.
They
exhibits
find
c o r r e l ations, e v e n M
form
Partial
Cross
a two-particle
distri-
for
lyg-y-jl
>>
.
Sections
and
Multiplicity
Distributions Another reactions cles
important
class
of d a t a
is the o b s e r v a t i o n
produced.
observed,
Since
the d a t a
of
the n e u t r a l s
collected
of the
as a f u n c t i o n
of b e a m e n e r g y .
is c a l l e d logical
a charqed-prong
cross
section).
on a ( n
Lake
hydrogen-target Lyon,
of the
,E) at h i g h
1970;
two-dimensional
in F i g s . plicity
16-18.
cross
energies
1971). cr (n
events
prongs
section
comes
experiment Various
nc
and
twonormalized,
(or a
from
not
topo-
informathe
Echo
(Jones,
cross-sections
, E) d i s t r i b u t i o n
are
charged
shown
multi-
= I nc n
aT(E)
a(nc,E)/aT(E),
c e I a(nc,E), n
in Fig.
These on
of
resulting
the average
parti-
usually
The most extensive
Finally,
is s h o w n
of
, E ) properly
cosmic-ray
Lyon,
are
numbers
The c
multiparticle
number
of c h a r g e d
d i s t r i b u t i o n , CT(n
tion
1970;
number
are
as a f u n c t i o n
dimensional
the
on
(2.72)
c
1.
pioneering
the m o d e l - b u i 1 d e r s .
data
place
The
important
d a t a on < n c ( E ) >
572
constraints in F i g .
1,
which are well uncomfortable
fit
by growth l i n e a r
to a d v o c a t e s
of models which
c o n s t a n t or powerlaw b e h a v i o r . former i s what we s h a l l fragmentation
picture;
i n £nE,
call
are imply
An example of
the n a i v e
diffractive-
an example of the l a t t e r
the Cheng-Wu i t e r a t e d t o w e r - d i a g r a m model. t i o n of l o g a r i t h m i c
the p r e d i c t i o n was c o n t a i n e d Fubini
paper
i n the c l a s s i c
can be made c o m p a t i b l e w i t h
Amati,
physical logarithmic
g r o w t h ; f o r example, a d e t a i l e d d i f f r a c t i v e been c o n s t r u c t e d by Hwa
but t h e i r this.
is
picture
is
that
approach c o n s t a n t
The p l o t s
of a ( n
,E)
individual limits
The s o l i d
lines
the cross
energies.
f o r each n c shown i n F i g s .
cross
This
also
model
based on the
573
predicts
to a maximum,
is
17 and 18, e s p e c i a l l y
are a f i t
17
interpretation.
section an r i s e s
o f f with energy.
s i s t e n t with F i g s .
of
partial
at h i g h
On the o t h e r hand, the m u l t i p e r i p h e r a l
then f a l l s
in
to do
prediction
and 18 are not i n c o n s i s t e n t w i t h t h i s
t h a t each p a r t i a l
has
constraints,
insufficient
For example, a d e f i n i t i v e
sections
distribution
impose much more s e v e r e
present accuracy
diffractive
model
(1971).
The d e t a i l e d t w o - d i m e n s i o n a l Figs. 1 6 - 1 8 w i l l
fact,
Nevertheless,
o t h e r models based on q u i t e d i f f e r e n t pictures
consti-
models--in
(1962).
is
Observa-
growth of m u l t i p l i c i t y
t u t e s a triumph f o r m u l t i p e r i p h e r a l
Stanghellini,
the
not Fig.
incon18.
simplest
multiperipheral which
predicts
model,
a Poisson „
The
fit
(1969) of
shown that
n "
follows
one
produced
the
use
r c
Chew-Pignotti
TQ .
is t h a t as the e n e r g y creation
(3-14) m/T
momenta
collisions
statistical
distributions:
of s e c o n d a r i e s
follows
model, with 587
The
rather
distriproduced
directly
a minimum
of
further
assumptions.
It is c o n t r o l l e d
factor
The
T is model much
less
dependent, than T Q
o f the m o s t transverse same
spectrum
for
momentum
a comparison
values
high-energy
collisions.
successes
vnferred
Figure
is the
of p a i r s massive shown
calculation
of p a r t i c l e s ,
in F i g .
becomes
22.
For
approximately
Successful
ray
One is
that the
(1970)
of < q ± >
with
data.
of the
A similar
rate of
rate
example,
appli-
production
of p r o d u c t i o n
KK p r o d u c t i o n ,
exp(-M/T) £ range
very
particle
Hagedorn
large masses,
predictions
the
values
pairs:
a n d the
One
from
from
of c a l c u l a t e d
from cosmic
particles.
21
of
can be f i t w i t h
determined
P r o d u c t ion of p a r t i c l e cation
of the m o d e l
distributions
20.
determination
r a t e T is n o t
160 MeV
in Fig.
statistical
b u t at any
impressive
value T Q £
shows
by a
of
is
the w e i g h t
factor
exp(-M/TQ).
over many
orders
of
magni tude. Inclusive tical
model
spectra:
is v e r y
transverse-momentum longitudinal are
treated same
could
forward-backward 1950).
saw a b o v e , in
however,
and
pure
statistical
longitudinal
peaking Hagedorn
in
model,
momenta
the
588
Ranft
to
assumptions
on
which the
observed
the c e n t e r - o f - m a s s
and
statis-
W h e n we t u r n
additional
not reproduce
the
predicting
distributions.
Fermi's
transverse
footing,
(Fermi,
impressive
momenta,
necessary.
As we
(1968)
system
overcome
this
difficulty
emanate
by a s s u m i n g
not f r o m
position
of f i r e b a l l s
of l o n g i t u d i n a l done Ranft
a single
in t e r m s
t h a t the
fireball,
with
the
use a r e l a t e d
single-particle
Eq
If the
rapidity y variable
inclusive
0
but f r o m a
super-
distribution
superposition
(actually
A),
were
Hagedorn
the m o d e l
spectrum would
E
Y = / dy F ( Y , y ) o
products
a continuous
velocities.
of
reaction
for
and
the
be
p(qi>q„)s)
L(y)
f(E',T(y)), "
(3.15a)
where = [eE/T
f(E,T) and where
L(y)
formation
on f ( E ' , T ) .
arbitrary
and
Since
the o t h e r is g i v e n
the
hand,
the
provided F(y). fitting
to f i t the
success the
t h a t at high
energies
o f the
longitudinal
are
It is
589
On
distribution
is
is
peaked
purely
consistent
fragmentation, T
TQ
Hagedorn-Ranft
momentum
is
made
valid.
f(E,T)
the m o d e l
limiting
is
comments
momentum
respect.
trans-
distribution
since
Therefore
of
Lorentz
data.
the m o d e l
by F ( Y , y ) ,
in t h i s
hypothesis
Successes
of
(3.15b)
F(Y,y)
the
longitudinal
of q„.
phenomenological with
function
superposition,
essentially
at low v a l u e s
The
transverse-momentum
by the
about
a longitudinal
is c h o s e n
the
unaffected above
denotes
± I]"1,
and
F ( Y , y ) ->-
model
distributions
in are
thus
largely the
tests
of i d e a s w h i c h
specific model;
in p a r t i c u l a r ,
limiting
fragmentation
achieved
at accelerator
The m o d e l satisfy one
can c h o o s e
The
variable
less
as we
scaling,
The model
(DeTar,
discuss
literature
tuning
the
to f u r t h e r
followed
by the
Hagedorn
(1970),
be r e a d y
for
1968;
be f l a t used
this
that
well
it can
In o t h e r in the
as
also
language,
central
by H a g e d o r n
purpose,
on
the
and
DeTar
statistical we h a v e
successes
intricacies
of the m o d e l
duction
formulated
Although
impressive all
fact
than
region. Ranft
is
has
1971).
is l e n g t h y .
the m o s t
Ranft,
for
the
to be f a i r l y
at x = 0.
to
general
energies.
A actually
convenient
discussed
seems
have
even
F(y)
are m o r e
to fit the d a t a .
review
the o r i g i n a l Hagedorn,
suggest
of R a n f t a n d
at w h i c h
p o i n t the literature
1968).
590
tried
to
identify
of the m o d e l , we
involved
s t u d y , we
thermodynamical
in the As
an
fine intro-
Frautschi Ranft
cannot
(1971),
(1970)
student
and
should
(Hagedorn
and
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FIGURE 1.
CAPTIONS
Average m u l t i p l i c i t y
of charged s e c o n d a r i e s
f u n c t i o n of c e n t e r - o f - m a s s the Echo Lake c o s m i c - r a y
energy
as a
(minus 2rrip)
experiment
in
(Jones,
( 1 970 ). 2.
Contours of constant cross of l o n g i t u d i n a l secondary
s e c t i o n as a f u n c t i o n
and t r a n s v e r s e momentum of
particle,
for various
The c o n t o u r a t 12.5 GeV/c i s et a l . 3.
(1971);
the o t h e r s
Velde,
T:+ d i s t r i b u t i o n
IT" d i s t r i b u t i o n
1971; Chen,
inclusive
different
energies
bution is
limiting.
spectrum.
(7)
Graphical
display
total
as a
x = R (Vander
1971; Chen,
T e s t of l i m i t i n g - d i s t r i b u t i o n
anything at v a r i o u s
cross
energy
1971). energy
1971).
hypothesis
1n
spectrum of pp
beam e n e r g i e s . should coincide
ir~ +
Points if
(6) L o n g i t u d i n a l
at
distrimomentum
T r a n s v e r s e momentum s p e c t r u m . of u n i t a r i t y
section
forward s c a t t e r i n g 9.
variable
energies,
as a f u n c t i o n of i n c i d e n t
x (Anthony,
single-particle
8.
estimated.
as a f u n c t i o n of i n c i d e n t
x (Anthony,
at v a r i o u s 6,7.
are
Akerlof
1970).
at v a r i o u s 5.
taken from
IT" p r o d u c t i o n compared at v a r i o u s f u n c t i o n of the s c a l i n g
4.
beam momenta.
relation
and i m a g i n a r y
part
between of
amplitude.
Generalized u n i t a r i t y
relation
609
for
single-
particle
inclusive
absorptive 10.
M u e l l e r diagram d e s c r i b i n g
particle
to c e n t r a l
M u e l l e r diagrams
describing
(a)
regions
region.
(b) P r o j e c t i l e - f r a g m e n t a t i o n
single-
Target-fragmentation region.
i n the l a b o r a t o r y
reactions
energies
at d i f f e r e n t is
n o r m a l i z e d by i t s
section.
limit
of
Momentum d i s t r i b u t i o n s
mentation
single-
single-Regge
to f r a g m e n t a t i o n
factorization
Equality
for
(see t e x t ) .
asymptotic
of d i s t r i b u t i o n s
and h y p o t h e s i s
four Each
total
of l i m i t i n g
tests frag-
(Chen, 1 9 7 1 ) .
(12)
Longitudinal-
momentum d i s t r i b u t i o n s .
(13)
Transverse-
momentum
distributions.
Hypothetical
single-particle
as a f u n c t i o n of r a p i d i t y . target-fragmentation
Some e x p e r i m e n t a l variable y is
inclusive Illustrated
r e g i o n T, c e n t r a l
C, and b e a m - f r a g m e n t a t i o n rapidity
region
Charged-multipiicity
of
are plateau
B.
which
The
differs
scale.
distributions
a
spectrum
distributions.3
the c.m. r a p i d i t y ,
from y o n l y by a s h i f t 16.
limit
p l a t e a u r e g i o n of
spectrum.
cross
15.
amplitude.
double-Regge
particle
reaction
14.
them to
spectrum.
appropriate
12. 13.
relating
part of forward three-body
appropriate
11.
reactions,
i n Echo Lake
B N L - R o c h e s t e r - W i s c o n s i n c o l l a b o r a t i o n ; communicated by T. Ferbel and L. L. Wang at the Cal Tech c o n f e r e n c e "Phenomenology i n P a r t i c l e P h y s i c s 1 9 7 1 " . 610
c o s m i c - r a y data distribution 17.
Partial
(Jones,
1 9 7 0 ) , w i t h two
fits.
cross
sections
f o r pp + n c h a r g e d
Echo Lake and a c c e l e r a t o r data multiperipheral-model 18.
Two- and f o u r - p r o n g and a c c e l e r a t o r
19.
Poisson-
(Lyon,
prongs,
1971),
with
fit.
cross
sections,
Echo Lake
data.
G r a p h i c v e r s i o n of m u l t i p e r i p h e r a l
bootstrap
equation. 20.
D e n s i t y of p a r t i c l e
and r e s o n a n c e s t a t e s ,
pared to s t a t i s t i c a l - m o d e l
p r e d i e t ion
com-
(Hagedorn,
1967). 21.
Average t r a n s v e r s e momentum p r e d i c t i o n s statistical (Hagedorn,
22.
of
model, compared to c o s m i c - r a y
data
1968).
Statistical
model p r e d i c t i o n s
of KK p a i r s
(Hagedorn,
1968).
611
f o r mass
spectrum
612
P +P o
>
1001
* r
so
t t ~ + (anyl-fling)
(a)
l
c;
X 0 " í 15 m rad
T f ^ .
•O
— p 0 = 30 GeV/c ° P0 = 19.2 Gev/c * P0 = 70Gev/c ( A l ) - 3
- S 10 c
5
»
100 50
TT
10 (b)
5
2
Zero degrees ° P0 = 18.8 Gev/c • P0 = 23.1 Gev/c
.3 Fig.
613
3
f 3
1
J
1
•
V
13
A
18
o
21
•
24
•
28.5
0.2 0.1 -0.4
1
1 -0.2
i
1
1
i
0.2
0 V l a b
¡n GeV/c Fig.
616
6
i
i 0.4
i
0.6
Fig.
617
7
618
co
evi X
Kl X
619
Pa
ft
-q
Pb
ßb
vwwv
Pa
Pb
Fig.
10
(b)
(o) Fig.
11 620
-
cu
o h —