Analytic K-Homology,9780198511762

Analytic K-Homology

by ;
ISBN13: 9780198511762
ISBN10: 0198511760
Format: Hardcover
Pub. Date: 2001-02-15
Publisher(s): Oxford University Press
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Summary

Analytic K-homology draws together ideas from algebraic topology, functional analysis and geometry. It is a tool - a means of conveying information among these three subjects - and it has been used with specacular success to discover remarkable theorems across a wide span of mathematics. Thepurpose of this book is to acquaint the reader with the essential ideas of analytic K-homology and develop some of its applications. It includes a detailed introduction to the necessary functional analysis, followed by an exploration of the connections between K-homology and operator theory, coarsegeometry, index theory, and assembly maps, including a detailed treatment of the Atiyah-Singer Index Theorem. Beginning with the rudiments of C* - algebra theory, the book will lead the reader to some central notions of contemporary research in geometric functional analysis. Much of the materialincluded here has never previously appeared in book form.

Table of Contents

C*-Algebras and Operator Theory
1(29)
Bounded Operators and Functional Calculus
1(5)
Positive Operators and the Strong Operator Topology
6(2)
C*-Algebras
8(4)
The GNS Construction
12(2)
Representations of Commutative C*-Algebras
14(2)
Abstract C*-Algebras
16(1)
Ideals and Quotients
17(2)
Unbounded Operators
19(3)
Exercises
22(5)
Notes
27(2)
Index Theory and Extensions
29(26)
Fredholm Operators and the Calkin Algebra
29(3)
The Essential Spectrum
32(2)
The Toeplitz Extension
34(2)
Essentially Normal Operators
36(2)
C*-Algebra Extensions
38(2)
Extensions and the Calkin Algebra
40(1)
The Extension Semigroup
41(3)
Geometric Examples of Extensions
44(5)
Exercises
49(5)
Notes
54(1)
Completely Positive Maps
55(30)
Completely Positive Maps
55(2)
Quasicentral Approximate Units
57(3)
Nuclearity
60(3)
Voiculescu's Theorem
63(2)
Block-Diagonal Maps
65(3)
Proof of Voiculescu's Theorem
68(3)
Property T and Ext
71(5)
Kasparov's Technical Theorem
76(3)
Exercises
79(4)
Notes
83(2)
K-Theory
85(38)
The Group K0(A)
85(5)
K0 for Non-Unital Algebras
90(2)
Relative K-Theory and Excision
92(5)
Homotopy
97(1)
Higher K-Theory
98(3)
Inner Automorphisms
101(2)
Products
103(3)
Another Description of K1
106(4)
Bott Periodicity
110(3)
Exercises
113(7)
Notes
120(3)
Duality Theory
123(18)
Extension Groups and Dual C*-Algebras
123(2)
K-Homology
125(5)
Relative K-Homology
130(3)
Excision in K-Homology
133(4)
Example: the Theta Curve
137(1)
Exercises
138(1)
Notes
139(2)
Coarse Geometry and K-Homology
141(26)
Coarse Structures
141(4)
Coarse Geometry of Cones
145(2)
The C*-Algebra of a Coarse Space
147(5)
K-Theory for Metric Coarse Structures
152(5)
K-Theory for Topological Coarse Structures
157(3)
The Homotopy Invariance of K-Homology
160(2)
Exercises
162(3)
Notes
165(2)
The Brown-Douglas-Fillmore Theorem
167(32)
Generalized Homology Theories
168(2)
The Index Pairing
170(10)
Steenrod Homology Theory
180(3)
The Cluster Axiom for K-Homology
183(3)
The Brown-Douglas-Fillmore Theorem
186(2)
The Universal Coefficient Theorem
188(8)
Exercises
196(2)
Notes
198(1)
Kasparov's K-Homology
199(40)
Fredholm Modules
199(5)
The Kasparov Groups
204(4)
Normalization of Fredholm Modules
208(4)
Kasparov Theory and Duality
212(3)
Relative K-Homology
215(4)
Schrodinger Pairs
219(4)
The Index Pairing
223(10)
Exercises
233(4)
Notes
237(2)
The Kasparov Product
239(30)
The Product of Fredholm Operators
239(4)
The Definition of the Kasparov Product
243(5)
Index One Operators and Homotopy Invariance
248(4)
Stability
252(1)
Bott Periodicity
253(6)
Boundary Maps and the Kasparov Product
259(5)
The Kasparov Product and the Index Pairing
264(1)
Exercises
265(2)
Notes
267(2)
Elliptic Differential Operators
269(36)
First-Order Differential Operators
269(2)
Symmetric and Selfadjoint Differential Operators
271(3)
Wave Operators
274(5)
Ellipticity
279(5)
Elliptic Operators on Open Manifolds
284(2)
The Homology Class of a Selfadjoint Operator
286(4)
Elliptic Operators and the Kasparov Product
290(3)
The Homology Class of a Symmetric Operator
293(4)
Exercises
297(6)
Notes
303(2)
Index Theory
305(42)
Dirac Operators
306(5)
Spinc-Manifolds
311(7)
Even-Dimensional Spinc-Manifolds
318(2)
Index Theory for Hypersurfaces
320(6)
The Index Theorem for Spinc-Manifolds
326(3)
Toeplitz Index Theorems
329(4)
Index Theory on Strongly Pseudoconvex Domains
333(8)
Exercises
341(4)
Notes
345(2)
Higher Index Theory
347(30)
Metrics of Positive Scalar Curvature
347(3)
Non-Positive Sectional Curvature
350(2)
Coarse Geometry and Assembly Maps
352(5)
Scaleable Spaces and the Baum-Connes Conjecture
357(6)
Equivariant Assembly
363(6)
The Descent Principle
369(4)
Exercises
373(2)
Notes
375(2)
Appendix A Gradings 377(10)
A.1 Graded Vector Spaces and Algebras
377(1)
A.2 Graded Tensor Products
378(1)
A.3 Multigradings
379(1)
A.4 Hermitian Modules and K-Theory
380(4)
A.5 Graded Hermitian Modules
384(1)
A.6 Notes
385(2)
Appendix B Real K-Homology 387(4)
B.1 Real C*-Algebras
387(1)
B.2 K-Theory for Real C*-Algebras
388(1)
B.3 K-Homology for Real C*-Algebras
389(1)
B.4 Notes
390(1)
References 391(10)
Index 401

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