000 | 00357nam a2200133Ia 4500 | ||
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999 |
_c184400 _d184400 |
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020 | _a0226511839 | ||
040 | _cCUS | ||
082 |
_a514.2 _bMAY/C |
||
100 | _aMay,J. Peter | ||
245 | 2 |
_aA concise course in algebraic topology/ _cJ. Peter May |
|
260 |
_aNew Delhi : _bUniversity Of Chicago Press, _c1999. |
||
300 |
_aix,243p. : _bill. ; _c23cm. |
||
440 | _aChicago lectures in mathematics. | ||
505 | _a1.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 | ||
650 | _aAlgebraic topology. | ||
942 | _cWB16 |