000 | 01451nam a2200217Ia 4500 | ||
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003 | OSt | ||
005 | 20240304125026.0 | ||
008 | 220128s9999 xx 000 0 und d | ||
020 | _a9781493990634 | ||
040 | _cCUS | ||
082 |
_a514.2 _bMAS/G |
||
100 |
_aMassey, William S _96655 |
||
245 | 2 | _aGraduate Texts in Mathematics A Basic Course in Algebraic Topology | |
260 |
_aNew York: _bSpringer, _c1991. |
||
300 | _axv,428p. | ||
505 | _a1: Two-Dimensional Manifolds .- 2: The Fundamental Group .- 3: Free Groups and Free Products of Groups.- 4: Seifert and Van Kampen Theorem on the Fundamental Group of the Union of Two Spaces. Applications .- 5: Covering Spaces .- 6: Background and Motivation for Homology Theory .- 7: Definitions and Basic Properties of Homology Theory .- 8: Determination of the Homology Groups of Certain Spaces: Applications and Further Properties of Homology Theory .- 9: Homology of CW-Complexes.- 10: Homology with Arbitrary Coefficient Groups .- 11: The Homology of Product Spaces.- 12: Cohomology Theory.- 13: Products in Homology and Cohomology.- 14: Duality Theorems for the Homology of Manifolds.- 15: Cup Products in Projective Spaces and Applications of Cup Products. Appendix A: A Proof of De Rham's Theorem..- Appendix B: Permutation Groups or Tranformation Groups. | ||
650 |
_aAlgebraische Topologie _96659 |
||
650 |
_aHomology and Cohomology _96660 |
||
942 |
_2ddc _cWB16 _02 |
||
947 | _a6995.98 | ||
999 |
_c211905 _d211905 |