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E-grāmata: Axiomatic Method and Category Theory

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  • Formāts: PDF+DRM
  • Sērija : Synthese Library 364
  • Izdošanas datums: 14-Oct-2013
  • Izdevniecība: Springer International Publishing AG
  • Valoda: eng
  • ISBN-13: 9783319004044
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Axiomatic Method and Category TheoryPalielināt
  • Formāts: PDF+DRM
  • Sērija : Synthese Library 364
  • Izdošanas datums: 14-Oct-2013
  • Izdevniecība: Springer International Publishing AG
  • Valoda: eng
  • ISBN-13: 9783319004044
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This volume explores the many different meanings of the notion of the axiomatic method, offering an insightful historical and philosophical discussion about how these notions changed over the millennia. The author, a well-known philosopher and historian of mathematics, first examines Euclid, who is considered the father of the axiomatic method, before moving onto Hilbert and Lawvere. He then presents a deep textual analysis of each writer and describes how their ideas are different and even how their ideas progressed over time. Next, the book explores category theory and details how it has revolutionized the notion of the axiomatic method. It considers the question of identity/equality in mathematics as well as examines the received theories of mathematical structuralism. In the end, Rodin presents a hypothetical New Axiomatic Method, which establishes closer relationships between mathematics and physics.Lawvere's axiomatization of topos theory and Voevodsky's axiomatization of higher homotopy theory exemplify a new way of axiomatic theory building, which goes beyond the classical Hilbert-style Axiomatic Method. The new notion of Axiomatic Method that emerges in categorical logic opens new possibilities for using this method in physics and other natural sciences.This volume offers readers a coherent look at the past, present and anticipated future of the Axiomatic Method.

This volume offers readers a coherent look at the past, present and anticipated future of the Axiomatic Method. It presents a hypothetical New Axiomatic Method, which establishes closer relationships between mathematics and physics.
1 Introduction
1(14)
Part I A Brief History of the Axiomatic Method
2 Euclid: Doing and Showing
15(24)
2.1 Demonstration and "Monstration"
16(3)
2.2 Are Euclid's Proofs Logical?
19(4)
2.3 Instantiation, Objecthood and Objectivity
23(4)
2.4 Proto-Logical Deduction and Geometrical Production
27(8)
2.5 Euclid and Modern Mathematics
35(4)
3 Hilbert: Making It Formal
39(34)
3.1 Foundations of 1899: Logical Form and Mathematical Intuition
40(7)
3.2 Foundations of 1899: Logicality and Logicism
47(7)
3.3 Axiomatization of Logic: Logical Form Versus Symbolic Form
54(6)
3.4 Foundations of 1927: Intuition Strikes Back
60(4)
3.5 Symbolic Logic and Diagrammatic Logic
64(4)
3.6 Foundations of 1934--1939: Doing Is Showing?
68(5)
4 Formal Axiomatic Method and the Twentieth Century Mathematics
73(26)
4.1 Set Theory
74(4)
4.2 Bourbaki
78(9)
4.3 Galilean Science and Set-Theoretic Foundations of Mathematics
87(6)
4.4 Towards the New Axiomatic Method: Interpreting Logic
93(6)
5 Lawvere: Pursuit of Objectivity
99(50)
5.1 Elementary Theory of the Category of Sets
104(1)
5.2 Category of Categories as a Foundation
105(5)
5.3 Conceptual Theories and Their Presentations
110(8)
5.4 Curry-Howard Correspondence and Cartesian Closed Categories
118(4)
5.5 Hyperdoctrines
122(3)
5.6 Functorial Semantics
125(1)
5.7 Formal and Conceptual
126(2)
5.8 Categorical Logic and Hegelian Dialectics
128(8)
5.9 Toposes and Their Internal Logic
136(13)
Part II Identity and Categorification
6 Identity in Classical and Constructive Mathematics
149(26)
6.1 Paradoxes of Identity and Mathematical Doubles
149(3)
6.2 Types and Tokens
152(1)
6.3 Frege and Russell on the Identity of Natural Numbers
153(1)
6.4 Plato
154(2)
6.5 Definitions by Abstraction
156(1)
6.6 Relative Identity
157(1)
6.7 Internal Relations
158(2)
6.8 Classes
160(3)
6.9 Individuals
163(3)
6.10 Extension and Intension
166(3)
6.11 Identity in the Intuitionistic Type Theory
169(6)
7 Identity Through Change, Category Theory and Homotopy Theory
175(40)
7.1 Relations Versus Transformations
175(6)
7.2 How to Think Circle
181(2)
7.3 Categorification
183(4)
7.4 Are Identity Morphisms Logical?
187(1)
7.5 Fibred Categories
188(2)
7.6 Higher Categories
190(3)
7.7 Homotopies
193(6)
7.8 Model Categories
199(2)
7.9 Homotopy Type Theory
201(3)
7.10 Univalent Foundations
204(11)
Part III Subjective Intuitions and Objective Structures
8 How Mathematical Concepts Get Their Bodies
215(20)
8.1 Changing Intuition
215(2)
8.2 Form and Motion
217(2)
8.3 Non-Euclidean Intuition
219(5)
8.4 Lost Ideals
224(6)
8.5 Are Intuitions Fundamental?
230(5)
9 Categories Versus Structures
235(30)
9.1 Structuralism, Mathematical
236(2)
9.2 What Replaces What?
238(4)
9.3 Erlangen Program and Axiomatic Method
242(4)
9.4 Objective Structures
246(3)
9.5 Types and Categories of Structures
249(4)
9.6 Invariance Versus Functoriality
253(2)
9.7 Are Categories Structures?
255(2)
9.8 Objects Are Maps
257(8)
10 New Axiomatic Method (Instead of Conclusion)
265(8)
10.1 Unification
265(2)
10.2 Concentration
267(1)
10.3 Internal Logic as a Guide and as an Organizing Principle
268(5)
Bibliography 273(10)
Index 283
Andrei Rodin studied mathematics and philosophy in Moscow and got his Ph.D. degree in philosophy from the Institute of Philosophy, Russian Academy of Sciences in 1995. His research interests lay in the history and philosophy of mathematics. During the last decade his research was focused on philosophical issues related to the Category theory. More information about Andrei Rodin is found on his personal website: philomatica.org
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