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Equivariant Ordinary Homology and Cohomology 1st ed. 2016 [Minkštas viršelis]

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  • Formatas: Paperback / softback, 294 pages, aukštis x plotis: 235x155 mm, weight: 4745 g, 1 Illustrations, black and white; XIV, 294 p. 1 illus., 1 Paperback / softback
  • Serija: Lecture Notes in Mathematics 2178
  • Išleidimo metai: 03-Jan-2017
  • Leidėjas: Springer International Publishing AG
  • ISBN-10: 3319504479
  • ISBN-13: 9783319504476
Kitos knygos pagal šią temą:
Equivariant Ordinary Homology and Cohomology 1st ed. 2016Didesnis paveikslėlis
  • Formatas: Paperback / softback, 294 pages, aukštis x plotis: 235x155 mm, weight: 4745 g, 1 Illustrations, black and white; XIV, 294 p. 1 illus., 1 Paperback / softback
  • Serija: Lecture Notes in Mathematics 2178
  • Išleidimo metai: 03-Jan-2017
  • Leidėjas: Springer International Publishing AG
  • ISBN-10: 3319504479
  • ISBN-13: 9783319504476
Kitos knygos pagal šią temą:
Pastovi nuoroda: https://www.kriso.lt/db/9783319504476.html
Raktažodžiai:
Filling a gap in the literature, this book takes the reader to the frontiers of equivariant topology, the study of objects with specified symmetries. The discussion is motivated by reference to a list of instructive "toy" examples and calculations in what is a relatively unexplored field. The authors also provide a reading path for the first-time reader less interested in working through sophisticated machinery but still desiring a rigorous understanding of the main concepts. The subject"s classical counterparts, ordinary homology and cohomology, dating back to the work of Henri Poincaré in topology, are calculational and theoretical tools which are important in many parts of mathematics and theoretical physics, particularly in the study of manifolds. Similarly powerful tools have been lacking, however, in the context of equivariant topology. Aimed at advanced graduate students and researchers in algebraic topology and related fields, the book assumes knowledge of basic algebraic

topology and group actions.

1 RO(G) -graded Ordinary Homology and Cohomology.- 2 Parametrized Homotopy Theory and Fundamental Groupoids.- 3 RO ( B )-graded Ordinary Homology and Cohomology.

Recenzijos

By reading this book the reader will certainly be able to gain a comprehensive grasp of all the key concepts and knowledge required for understanding equivariant homology and cohomology theories for compact Lie groups and thereby hopefully be able to consider respective new perspectives on this subject. This book consists of an introduction and three chapters with bibliography and indexes of notations and subjects. (Haruo Minami, zbMATH 1362.55001, 2017)

1 RO(G)-Graded Ordinary Homology and Cohomology
1(154)
1.1 Examples of Equivariant Cell Complexes
3(7)
1.1.1 G-CW Complexes
3(3)
1.1.2 G-CW(V) Complexes
6(2)
1.1.3 Dual G-CW(V) Complexes
8(2)
1.2 Dimension Functions
10(4)
1.3 Virtual Representations
14(1)
1.4 Cell Complexes
15(14)
1.5 A Brief Introduction to Equivariant Stable Homotopy
29(3)
1.6 The Algebra of Mackey Functors
32(8)
1.7 Homology and Cohomology of Cell Complexes
40(7)
1.8 Ordinary and Dual Homology and Cohomology
47(1)
1.9 Stable G-CW Approximation of Spaces
48(5)
1.10 Homology and Cohomology of Spaces
53(16)
1.10.1 Cellular Chains of G-Spaces
53(1)
1.10.2 Definition and Properties of Homology and Cohomology
54(10)
1.10.3 Independence of Choices
64(5)
1.11 Atiyah-Hirzebruch Spectral Sequences and Uniqueness
69(3)
1.12 The Representing Spectra
72(5)
1.13 Change of Groups
77(35)
1.13.1 Subgroups
77(8)
1.13.2 Quotient Groups
85(20)
1.13.3 Subgroups of Quotient Groups
105(7)
1.14 Products
112(24)
1.14.1 Product Complexes
112(3)
1.14.2 Cup Products
115(14)
1.14.3 Slant Products, Evaluations, and Cap Products
129(7)
1.15 The Thorn Isomorphism and Poincare Duality
136(7)
1.15.1 The Thorn Isomorphism
136(3)
1.15.2 Poincare Duality
139(4)
1.16 An Example: The Rotating Sphere
143(3)
1.17 A Survey of Calculations
146(4)
1.18 Relationship to Borel Homology
150(2)
1.19 Miscellaneous Remarks
152(3)
1.19.1 Ordinary Homology of G-Spectra
152(1)
1.19.2 Model Categories
153(2)
2 Parametrized Homotopy Theory and Fundamental Groupoids
155(48)
2.1 The Fundamental Groupoid
156(3)
2.2 Parametrized Spaces and Lax Maps
159(5)
2.3 Lax Maps and Model Categories
164(2)
2.4 Parametrized Spectra
166(3)
2.5 Lax Maps of Spectra
169(9)
2.6 The Stable Fundamental Groupoid
178(9)
2.7 Parametrized Homology and Cohomology Theories
187(3)
2.8 Representing Parametrized Homology and Cohomology Theories
190(4)
2.9 Duality
194(9)
3 RO(ΠB)-Graded Ordinary Homology and Cohomology
203(80)
3.1 Examples of Parametrized Cell Complexes
204(3)
3.1.1 G-CW(γ) Complexes
204(2)
3.1.2 Dual G-CW(γ) Complexes
206(1)
3.2 δ-G-CW(γ) Complexes
207(8)
3.3 Homology and Cohomology of Parametrized Cell Complexes
215(4)
3.4 Stable G-CW Approximation of Parametrized Spaces
219(3)
3.5 Homology and Cohomology of Parametrized Spaces
222(7)
3.6 Atiyah-Hirzebruch Spectral Sequences and Uniqueness
229(1)
3.7 The Representing Spectra
230(3)
3.8 Change of Base Space
233(8)
3.9 Change of Groups
241(19)
3.9.1 Subgroups
241(6)
3.9.2 Quotient Groups
247(9)
3.9.3 Subgroups of Quotient Groups
256(4)
3.10 Products
260(16)
3.10.1 Cup Products
260(9)
3.10.2 Slant Products, Evaluations, and Cap Products
269(7)
3.11 The Thorn Isomorphism and Poincare Duality
276(3)
3.11.1 The Thorn Isomorphism
276(1)
3.11.2 Poincare Duality
277(2)
3.12 A Calculation
279(4)
Bibliography 283(4)
Index of Notations 287(4)
Index 291