First-Order Logic and Automated Theorem Proving [2 ed.] 9781461275152
There are many kinds of books on formal logic. Some have philosophers as their intended audience, some mathematicians, s
327 126 2MB
English Pages 338 Year 1996
Table of contents :
Cover
Title Page
Copyight Page
Dedication Page
Preface
Preface to the Second Edition
Table of Contents
List of Tables
1 Background
2 Propositional Logic
2.1 Introduction
2.2 Propositional Logic-Syntax
2.3 Propositional Logic-Semantics
2.4 Boolean Valuations
2.5 The Replacement Theorem
2.6 Uniform Notation
2.7 Konig's Lemma
2.8 Normal Forms
2.9 Normal Form Implementations
3 Semantic Tableaux and Resolution
3.1 Propositional Semantic Tableaux
3.2 Propositional Tableaux Implementations
3.3 Propositional Resolution
3.4 Soundness
3.5 Hintikka's Lemma
3.6 The Model Existence Theorem
3.7 Tableau and Resolution Completeness
3.8 Completeness With Restrictions
3.9 Propositional Consequence
4 Other Propositional Proof Procedures
4.1 Hilbert Systems
4.2 Natural Deduction
4.3 The Sequent Calculus
4.4 Davis-Putnam procedure
4.5 Computational Complexity
5 First-Order Logic
5.1 First-Order Logic Syntax
5.2 Substitutions
5.3 First-Order Semantics
5.4 Herbrand Models
5.5 First-Order Uniform Notation
5.6 Hintikka's Lemma
5.7 Parameters
5.8 The Model Existence Theorem
5.9 Applications
5.10 Logical Consequence
6 First-Order Proof Procedures
6.1 First-Order Semantic Tableaux
6.2 First-Order Resolution
6.3 Soundness
6.4 Completeness
6.5 Hilbert Systems
6.6 Natural Deduction and Gentzen Sequents
7 Implementing Tableaux and Resolution
7.1 What Next
7.2 Unification
7.3 Unification Implemented
7.4 Free-Variable Semantic Tableaux
7.5 A Tableau Implementation
7.6 Free-Variable Resolution
7.7 Soundness
7.8 Free-Variable Tableaux Completeness
7.9 Free-Variable Resolution Completeness
8 Further First-Order Features
8.1 Introduction
8.2 The Replacement Theorem
8.3 Skolemization
8.4 PrenexForm
8.4 The AE Calculus
8.6 Herbrand's Theorem
8.7 Herbrand's Theorem, Constructively
8.8 Gentzen's Theorem
8.9 Cut Elimination
8.10 Do Cuts Shorten Proofs?
8.11 Craig's Interpolation Theorem
8.12 Craig's Interpolation Theorem—Constructively
8.13 Beth's Definability Theorem
8.14 Lyndon's Homomorphism Theorem
9 Equality
9.1 Introduction
9.2 Syntax and Semantics
9.3 The Equality Axioms
9.4 Hintikka's Lemma
9.5 The Model Existence Theorem
9.6 Consequences
9.7 Tableau and Resolution Systems
9.8 Alternate Tableau and Resolution Systems
9.9 A Free-Variable Tableau System With Equality
9.10 A Tableau Implementation With Equality
9.11 Para-modulation
References
Index
Cover
Title Page
Copyight Page
Dedication Page
Preface
Preface to the Second Edition
Table of Contents
List of Tables
1 Background
2 Propositional Logic
2.1 Introduction
2.2 Propositional Logic-Syntax
2.3 Propositional Logic-Semantics
2.4 Boolean Valuations
2.5 The Replacement Theorem
2.6 Uniform Notation
2.7 Konig's Lemma
2.8 Normal Forms
2.9 Normal Form Implementations
3 Semantic Tableaux and Resolution
3.1 Propositional Semantic Tableaux
3.2 Propositional Tableaux Implementations
3.3 Propositional Resolution
3.4 Soundness
3.5 Hintikka's Lemma
3.6 The Model Existence Theorem
3.7 Tableau and Resolution Completeness
3.8 Completeness With Restrictions
3.9 Propositional Consequence
4 Other Propositional Proof Procedures
4.1 Hilbert Systems
4.2 Natural Deduction
4.3 The Sequent Calculus
4.4 Davis-Putnam procedure
4.5 Computational Complexity
5 First-Order Logic
5.1 First-Order Logic Syntax
5.2 Substitutions
5.3 First-Order Semantics
5.4 Herbrand Models
5.5 First-Order Uniform Notation
5.6 Hintikka's Lemma
5.7 Parameters
5.8 The Model Existence Theorem
5.9 Applications
5.10 Logical Consequence
6 First-Order Proof Procedures
6.1 First-Order Semantic Tableaux
6.2 First-Order Resolution
6.3 Soundness
6.4 Completeness
6.5 Hilbert Systems
6.6 Natural Deduction and Gentzen Sequents
7 Implementing Tableaux and Resolution
7.1 What Next
7.2 Unification
7.3 Unification Implemented
7.4 Free-Variable Semantic Tableaux
7.5 A Tableau Implementation
7.6 Free-Variable Resolution
7.7 Soundness
7.8 Free-Variable Tableaux Completeness
7.9 Free-Variable Resolution Completeness
8 Further First-Order Features
8.1 Introduction
8.2 The Replacement Theorem
8.3 Skolemization
8.4 PrenexForm
8.4 The AE Calculus
8.6 Herbrand's Theorem
8.7 Herbrand's Theorem, Constructively
8.8 Gentzen's Theorem
8.9 Cut Elimination
8.10 Do Cuts Shorten Proofs?
8.11 Craig's Interpolation Theorem
8.12 Craig's Interpolation Theorem—Constructively
8.13 Beth's Definability Theorem
8.14 Lyndon's Homomorphism Theorem
9 Equality
9.1 Introduction
9.2 Syntax and Semantics
9.3 The Equality Axioms
9.4 Hintikka's Lemma
9.5 The Model Existence Theorem
9.6 Consequences
9.7 Tableau and Resolution Systems
9.8 Alternate Tableau and Resolution Systems
9.9 A Free-Variable Tableau System With Equality
9.10 A Tableau Implementation With Equality
9.11 Para-modulation
References
Index
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