A concise course in algebraic topology/ J. Peter May
Material type: TextSeries: Chicago lectures in mathematicsPublication details: New Delhi : University Of Chicago Press, 1999Description: ix,243p. : ill. ; 23cmISBN: 0226511839Subject(s): Algebraic topologyDDC classification: 514.2Item type | Current library | Call number | Status | Date due | Barcode | Item holds |
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General Books | Central Library, Sikkim University General Book Section | 514.2 MAY/C (Browse shelf(Opens below)) | Available | P39412 |
Browsing Central Library, Sikkim University shelves, Shelving location: General Book Section Close shelf browser (Hides shelf browser)
514.2 HAT/A Algebraic Topology | 514.2 MAS/A Algebraic Topology/ an introduction | 514.2 MAS/G Graduate Texts in Mathematics A Basic Course in Algebraic Topology | 514.2 MAY/C A concise course in algebraic topology/ | 514.2 MUN Elements of algebraic topology/ | 514.2 MUN/T Topology | 514.2 ROT/G An Introduction to Algebraic Topology |
1.The fundamental groups and some of its application
2.Categorial language
3.Covering spaces
4.Graphs
5.Compactly generated spaces
6.Cofibrations
7.Fibrations
8.Based cofiber and fiber sequences
9.Higher homotopy groups
10.CW complexes
11.The homotopy excision and suspension theorem
12.A little homological algebra
13.Axiomatic and cellular homology theory
14.Derivation of properties from the axioms
15.The Hurewicz
16.Singular homology theory
17.Some more homological algebra
18.Axiomatic and cellular cohomology theory
19.Derivation of properties from the axioms
20.The Poincare dualitytheorem
21.The index of manifolds
22.Homology,cohomology
23.Characteristic classes of vector bundles
24.An introduction to K-theory
25.An introduction to cobordism
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