代數(shù)拓?fù)渲v義

前言

This is essentially a book on singular homology and cohomology withspecial emphasis on products and manifolds. It does not treat homotopytheory except for some basic notions, some examples, and some applica-tions of homology to homotopy. Nor does it deal with general（-ised）homology, but many formulations and arguments on singular homologyare so chosen that they also apply to general homology. Because of theseabsences I have also omitted spectral sequences, their main applicationsin topology being to homotopy and general homology theory. ech-cohomology is treated in a simple ad hoc fashion for locally compactsubsets of manifolds; a short systematic treatment for arbitrary spaces,emphasizing the universal property of the （ech-procedure, is containedin an appendix.The book grew out of a one-year's course on algebraic topology, and itcan serve as a text for such a course. For a shorter basic course, say ofhalf a year, one might use chapters Ⅱ, Ⅲ, Ⅳ （§1-4）, Ⅴ （§ I-5, 7, 8）,VI （§ 3, 7, 9, 11, 12）. As prerequisites the student should know theelementary parts of general topology, abelian group theory, and thelanguage of categories-although our chapter I provides a little helpwith the latter two. For pedagogical reasons, I have treated integralhomology only up to chapter VI; if a reader or teacher prefers tohave general coefficients from the beginning he needs to make only minoradaptions.As to the outlay of the book, there are eight chapters, Ⅰ-Ⅷ, and anappendix, A each of these is subdivided into several sections, 1, 2,Definitions, propositions, remarks, formulas etc. are consecutively num-bered in each , each number preceded by the number. A reference like Ⅲ, 7.6 points to chap. Ⅲ, 7, no. 6 （written 7.6） which may be adefinition, a proposition, a formula, or something else. If the chapternumber is omitted the reference is to the chapter at hand. References tothe bibliography are given by the author's name, e.g. Seifert-Threl-fall; or Steenrod 1951, if the bibliography lists more than one publica-tion by the same author.

內(nèi)容概要

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作者簡(jiǎn)介

作者：(德國(guó))多德

書(shū)籍目錄

Chapter Ⅰ　Preliminaries on Categories,Abelian Groups, and Homotopy　§1 Categories and Functors　§2 Abelian Groups (Exactness, Direct Sums,Free Abelian Groups)　§3 HomotopyChapter Ⅱ　Homology of Complexes　§1 Complexes　§2 Connecting Homomorphism,Exact Homology Sequence　§3 Chain-Homotopy　§4 Free ComplexesChapter Ⅲ　Singular Homology　§1 Standard Simplices and Their Linear Maps　§2 The Singular Complex　§3 Singular Homology　§4 Special Cases　§5 Invariance under Homotopy　§6 Barycentric Subdivision　§7 Small Simplices. Excision　§8 Mayer-Vietoris SequencesChapter Ⅳ　Applications to Euclidean Space　§1 Standard Maps between Cells and Spheres　§2 Homology of Cells and Spheres　§3 Local Homology    　§4 The Degree of a Map　§5 Local Degrees　§6 Homology Properties　of Neighborhood Retracts in IRn　§7 Jordan Theorem, Invariance of Domain　§8 Euclidean Neighborhood Retracts (ENRs)Chapter Ⅴ　Cellular Decomposition and Cellular Homology　§1 Cellular Spaces　§2 CW-Spaces　§3 Examples　§4 Homology Properties of CW-Spaces　§5 The Euler-Poincare Characteristic　§6 Description of Cellular Chain Maps and of the Cellular Boundary Homomorphism　§7 Simplicial Spaces　§8 Simplicial HomologyChapter Ⅵ　Functors of Complexes　§1 Modules　§2 Additive Functors　§3 Derived Functors　§4 Universal Coefficient Formula　§5 Tensor and Torsion Products　§6 Hom and Ext　§7 Singular Homology and Cohomology with General Coefficient Groups　§8 Tensorproduct and Bilinearity　§9 Tensorproduct of Complexes Kunneth Formula　§10 Horn of Complexes. Homotopy Classification of Chain Maps　§11 Acyclic Models　§12 The Eilenberg-Zilber Theorem. Kunneth Formulas for SpacesChapter Ⅶ　Products　§1 The Scalar Product　§2 The Exterior Homology Product　§3 The Interior Homology Product(Pontrjagin Product　§4 Intersection Numbers in IRn　§5 The Fixed Point Index　§6 The Lefschetz-Hopf Fixed Point Theorem　§7 The Exterior Cohomology Product　……Chapter Ⅷ ManifoldsAppendixBibliographySubject Index

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