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Anotace knihy

PREFACE PART I. HISTORICAL INTRODUCTION 1. INTRODUCTORY REMARKS 2. ZERMELO'S SYSTEM. EQUALITY AND EXTENSIONALITY 3. "CONSTRUCTIVE" AXIOMS OF "GENERAL" SET THEORY" 4. THE AXIOM OF CHOICE 5. AXIOMS OF INFINITY AND OF RESTRICTION 6. DEVELOPMENT OF SET-THEORY FROM THE AXIOMS OF Z 7. "REMARKS ON THE AXIOM SYSTEMS OF VON NEUMANN, BERNAYS, GÖDEI" PART II. AXIOMATIC SET THEORY INTRODUCTION CHAPTER I. THE FRAME OF LOGIC AND CLASS THEORY 1. Predicate Calculus; Class Terms and Descriptions; Explicit Definitions 2. Equality and Extensionality. Application to Descriptions 3. Class Formalism. Class Operations 4. Functionality and Mappings CHAPTER II. THE START OF GENERAL SET THEORY 1. The Axioms of General Set Theory 2. Aussonderungstheorem. Intersection 3. Sum Theorem. Theorem of Replacement 4. Functional Sets. One-to-one Correspondences CHAPTER III. ORDINALS; NATURAL NUMBERS; FINITE SETS 1. Fundaments of the Theory of Ordinals 2. Existential Statements on Ordinals. Limit Numbers 3. Fundaments of Number Theory 4. Iteration. Primitive Recursion 5. Finite Sets and Classes CHAPTER IV. TRANSFINITE RECURSION 1. The General Recursion Theorem 2. The Schema of Transfinite Recursion 3. Generated Numeration CHAPTER V. POWER; ORDER; WELLORDER 1. Comparison of Powers 2. Order and Partial Order 3. Wellorder CHAPTER VI. THE COMPLETING AXIOMS 1. The Potency Axiom 2. The Axiom of Choice 3. The Numeration Theorem. First Concepts of Cardinal Arithmetic 4. Zorn's Lemma and Related Principles 5. Axiom of Infinity. Denumerability CHAPTER VII. ANALYSIS; CARDINAL ARITHMETIC; ABSTRACT THEORIES 1. Theory of Real Numbers 2. Some Topics of Ordinal Arithmetic 3. Cardinal Operations 4. Formal Laws on Cardinals 5. Abstract Theories CHAPTER VIII. FURTHER STRENGTHENING OF THE AXIOM SYSTEM 1. A Strengthening of the Axiom of Choice 2. The Fundierungsaxiom 3. A one-to-one Correspondence between the Class of Ordinals and the Class of all Sets INDEX OF AUTHORS (PART I) INDEX OF SYMBOLS (PART II) Predicates Functors and Operators Primitive Symbols INDEX OF MATTERS (PART II) LIST OF ATOMS (PART II) BIBLIOGRAPHY (PART I AND II)

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Zařazení knihy Knihy v angličtině Mathematics & science Mathematics Mathematical foundations

• Plný název: Axiomatic Set Theory
• Autor: Paul Bernays
• Jazyk: Angličtina
• Vazba: Brožovaná
• Počet stran: 256
• EAN: 9780486666372
• ISBN: 0486666379
• ID: 02569655
• Nakladatelství: Dover Publications Inc.
• Hmotnost: 270 g
• Rozměry: 213 × 137 × 13 mm
• Datum vydání: 28. March 2003

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