Originally published as volume 200 in the series: Grundlehren der mathematischen Wissenschaften
This is essentially a book on singular homology and cohomology with special emphasis on products and manifolds. It does not treat homotopy theory except for some basic notions, some examples, and some applica tions of (co-)homology to homotopy. Nor does it deal with general(-ised) homology, but many formulations and arguments on singular homology are so chosen that they also apply to general homology. Because of these absences I have also omitted spectral sequences, their main applications in topology being to homotopy and general (co-)homology theory. Cech cohomology is treated in a simple ad hoc fashion for locally compact subsets of manifolds; a short systematic treatment for arbitrary spaces, emphasizing the universal property of the Cech-procedure, is contained in an appendix. The book grew out of a one-year's course on algebraic topology, and it can serve as a text for such a course. For a shorter basic course, say of half a year, one might use chapters II, III, IV (§§ 1-4), V (§§ 1-5, 7, 8), VI (§§ 3, 7, 9, 11, 12). As prerequisites the student should know the elementary parts of general topology, abelian group theory, and the language of categories - although our chapter I provides a little help with the latter two. For pedagogical reasons, I have treated integral homology only up to chapter VI; if a reader or teacher prefers to have general coefficients from the beginning he needs to make only minor adaptions.
Author(s): Albrecht Dold
Series: Classics in Mathematics
Publisher: Springer
Year: 1995
Language: English
Pages: XI, 379
Tags: Algebraic Topology
Front Matter....Pages I-XI
Preliminaries on Categories, Abelian Groups and Homotopy....Pages 1-15
Homology of Complexes....Pages 16-28
Singular Homology....Pages 29-53
Applications to Euclidean Space....Pages 54-84
Cellular Decomposition and Cellular Homology....Pages 85-122
Functors of Complexes....Pages 123-185
Products....Pages 186-246
Manifolds....Pages 247-367
Back Matter....Pages 368-377