Book:Angelo Margaris/First Order Mathematical Logic

Subject Matter

 * Predicate Logic
 * Mathematical Logic

Contents

 * CHAPTER I. INTRODUCTION
 * 1. Rules of Inference
 * 2. Set Theory
 * 3. Axiomatic Theories
 * 4. Predicates and Quantifiers
 * 5. Statement Connectives
 * 6. The Interpretation of Predicates and Quantifiers
 * 7. The Predicate Calculus and First Order Theories
 * 8. The Omission of Parentheses
 * 9. Substitution of a Term for a Variable
 * 10. Removing and Inserting Quantifiers
 * 11. Denials


 * CHAPTER II. THE PREDICATE CALCULUS
 * 12. Formulation
 * 13. The Statement Calculus
 * 14. The Deduction Theorem
 * 15. The Completeness Theorem for the Statement Calculus
 * 16. Applications of the Completeness Theorem for the Statement Calculus
 * 17. Quantifiers
 * 18. Equivalence and Replacement
 * 19. Theorem Schemes
 * 20. Normal Forms
 * 21. Equality


 * CHAPTER III. FIRST ORDER THEORIES
 * 22. Definition and Examples
 * 23. Deduction
 * 24. Number Theory
 * 25. Consistency and Completeness
 * 26. Truth
 * 27. The Completeness Theorem
 * 28. Independence
 * 29. Completeness and Categoricity
 * 30. Decidability
 * 31. Gödel's Theorem


 * Notes


 * References


 * Indexes