代数拓扑导论

简介

目录

PrefaceTo the ReaderCHAPTER 0 Introduction Notation Brouwer Fixed Point Theorem Categories and FunctorsCHAPTER 1 Some Basic Topological Notions Homotopy Convexity, Contractibility, and Cones Paths and Path ConnectednessCHAPTER 2 Simplexes Affine Spaces Aftine MapsCHAPTER 3 The Fundamental Group The Fundamental Groupoid The Functor π π1(S1)CHAPTER 4 Singular Homology Holes and Green's Theorem Free Abelian Groups The Singular Complex and Homology Functors Dimension Axiom and Compact Supports The Homotopy Axiom The Hurewicz TheoremCHAPTER 5 Long Exact Sequences The Category Comp Exact Homology Sequences Reduced HomologyCHAPTER 6 Excision and Applications Excision and Mayer-Vietoris Homology of Spheres and Some Applications Barycentric Subdivision and the Proof of Excision Moxe Applications to Euclidean SpaceCHAPTER 7 Simplicial Complexes Definitions Simplicial Approximation Abstract Simplicial Complexes Simplicial Homology Comparison with Singular Homology Calculations Fundamental Groups of Polyhedra The Seifert-van Kampen TheoremCHAPTER 8 CW Complexes Hausdorff Quotient Spaces Attaching Calls Homology and Attaching Cells CW Complexes Cellular HomologyCHAPTER 9 Natural Transformations Definitions and Examples Eilenberg-Steenrod Axioms Chain Equivalences Acyclic Models Lefschetz Fixed Point Theorem Tensor Products Universal Coefficients Eilenberg-Zilber Theorem and the Kiinneth FormulaCHAPTER 10 Covering Spaces Basic Properties Covering Transformations Existence Orbit SpacesCHAPTER 11 Homotopy Groups Function Spaces Group Objects and Cogroup Objects Loop Space and Suspension Homotopy Groups Exact Sequences Fibrations A Glimpse AheadCHAPTER 12 Cohomology Differential Forms Cohomoiogy Groups Universal Coefficients Theorems for Cohomology Cohomology Rings Computations and ApplicationsBibliographyNotationIndex