Sheaves in Geometry and Logic,9780387977102

Sheaves in Geometry and Logic

by ;
ISBN13: 9780387977102
ISBN10: 0387977104
Format: Paperback
Pub. Date: 1992-04-01
Publisher(s): Springer Verlag
List Price: $84.99

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Summary

This text presents topos theory as it has developed from the study of sheaves. Sheaves arose in geometry as coefficients for cohomology and as descriptions of the functions appropriate to various kinds of manifolds (algebraic, analytic, etc.). Sheaves also appear in logic as carriers for models of set theory as well as for the semantics of other types of logic. Grothendieck introduced a topos as a category of sheaves for algebraic geometry. Subsequently, Lawvere and Tierney obtained elementary axioms for such (more general) categories.This introduction to topos theory begins with a number of illustrative examples that explain the origin of these ideas and then describes the sheafification process and the properties of an elementary topos. The applications to axiomatic set theory and the use in forcing (the Independence of the Continuum Hypothesis and of the Axiom of Choice) are then described. Geometric morphisms- like continuous maps of spaces and the construction of classifying topoi, for example those related to local rings and simplicial sets, next appear, followed by the use of locales (pointless spaces) and the construction of topoi related to geometric languages and logic. This is the first text to address all of these varied aspects of topos theory at the graduate student level.

Table of Contents

Preface vii
Prologue 1(9)
Categorical Preliminaries 10(14)
Categories of Functors
24(40)
The Categories at Issue
24(5)
Pullbacks
29(2)
Characteristic Functions of Subobjects
31(4)
Typical Subobject Classifiers
35(4)
Colimits
39(5)
Exponentials
44(4)
Propositional Calculus
48(2)
Heyting Algebras
50(7)
Quantifiers as Adjoints
57(7)
Exercises
62(2)
Sheaves of Sets
64(42)
Sheaves
65(4)
Sieves and Sheaves
69(4)
Sheaves and Manifolds
73(6)
Bundles
79(4)
Sheaves and Cross-Sections
83(5)
Sheaves as Etale Spaces
88(7)
Sheaves with Algebraic Structure
95(2)
Sheaves are Typical
97(2)
Inverse Image Sheaf
99(7)
Exercises
103(3)
Grothendieck Topologies and Sheaves
106(55)
Generalized Neighborhoods
106(3)
Grothendieck Topologies
109(7)
The Zariski Site
116(5)
Sheaves on a Site
121(7)
The Associated Sheaf Functor
128(6)
First Properties of the Category of Sheaves
134(6)
Subobject Classifiers for Sites
140(5)
Subsheaves
145(5)
Continuous Group Actions
150(11)
Exercises
155(6)
First Properties of Elementary Topoi
161(57)
Definition of a Topos
161(6)
The Construction of Exponentials
167(4)
Direct Image
171(5)
Monads and Beck's Theorem
176(4)
The Construction of Colimits
180(4)
Factorization and Images
184(6)
The Slice Category as a Topos
190(8)
Lattice and Heyting Algebra Objects in a Topos
198(6)
The Beck-Chevalley Condition
204(6)
Injective Objects
210(8)
Exercises
213(5)
Basic Constructions of Topoi
218(49)
Lawvere-Tierney Topologies
219(4)
Sheaves
223(4)
The Associated Sheaf Functor
227(6)
Lawvere-Tierney Subsumes Grothendieck
233(2)
Internal Versus External
235(2)
Group Actions
237(3)
Category Actions
240(7)
The Topos of Coalgebras
247(9)
The Filter-Quotient Construction
256(11)
Exercises
263(4)
Topoi and Logic
267(80)
The Topos of Sets
268(9)
The Cohen Topos
277(7)
The Preservation of Cardinal Inequalities
284(7)
The Axiom of Choice
291(5)
The Mitchell-Benabou Language
296(6)
Kripke-Joyal Semantics
302(13)
Sheaf Semantics
315(3)
Real Numbers in a Topos
318(6)
Brouwer's Theorem: All Functions are Continuous
324(7)
Topos-Theoretic and Set-Theoretic Foundations
331(16)
Exercises
343(4)
Geometric Morphisms
347(72)
Geometric Morphisms and Basic Examples
348(5)
Tensor Products
353(8)
Group Actions
361(5)
Embeddings and Surjections
366(12)
Points
378(6)
Filtering Functors
384(6)
Morphisms into Grothendieck Topoi
390(4)
Filtering Functors into a Topos
394(5)
Geometric Morphisms as Filtering Functors
399(8)
Morphisms Between Sites
407(12)
Exercises
414(5)
Classifying Topoi
419(51)
Classifying Spaces in Topology
420(3)
Torsors
423(9)
Classifying Topoi
432(2)
The Object Classifier
434(3)
The Classifying Topos for Rings
437(8)
The Zariski Topos Classifies Local Rings
445(5)
Simplicial Sets
450(5)
Simplicial Sets Classify Linear Orders
455(15)
Exercises
466(4)
Localic Topoi
470(56)
Locales
471(2)
Points and Sober Spaces
473(2)
Spaces from Locales
475(5)
Embeddings and Surjections of Locales
480(7)
Localic Topoi
487(4)
Open Geometric Morphisms
491(9)
Open Maps of Locales
500(6)
Open Maps and Sites
506(5)
The Diaconescu Cover and Barr's Theorem
511(3)
The Stone Space of a Complete Boolean Algebra
514(5)
Deligne's Theorem
519(7)
Exercises
521(5)
Geometric Logic and Classifying Topoi
526(46)
First-Order Theories
527(3)
Models in Topoi
530(3)
Geometric Theories
533(6)
Categories of Definable Objects
539(14)
Syntactic Sites
553(6)
The Classifying Topos of a Geometric Theory
559(7)
Universal Models
566(6)
Exercises
569(3)
Appendix: Sites for Topoi 572(24)
1. Exactness Conditions
572(3)
2. Construction of Coequalizers
575(3)
3. The Construction of Sites
578(9)
4. Some Consequences of Giraud's Theorem
587(9)
Epilogue 596(7)
Bibliography 603(10)
Index of Notation 613(4)
Index 617

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