Synopses & Reviews
This self-contained treatment of algebraic topology assumes only some knowledge of real numbers and real analysis. The first three chapters focus on the basics of point-set topology, offering background to students approaching the subject with no previous knowledge. Readers already familiar with point-set topology can proceed directly to Chapter 4, which examines the fundamental group as well as homology groups and continuous mapping, barycentric subdivision and excision, the homology sequence, and simplicial complexes.
Exercises form an integral part of the text; they include theorems that are as valuable as some of those whose proofs are given in full. Author Andrew H. Wallace, Professor Emeritus at the University of Pennsylvania, concludes the text with a guide to further reading.
Synopsis
This self-contained treatment assumes only some knowledge of real numbers and real analysis. The first three chapters focus on the basics of point-set topology, after which the text proceeds to homology groups and continuous mapping, barycentric subdivision, and simplicial complexes. Exercises form an integral part of the text. 1961 edition.
About the Author
Andrew H.Wallace is Professor Emeritus at the University of Pennsylvania.
Table of Contents
Prerequisites
I. Introduction
II. Topological Spaces
III. Topological Properties of Spaces
IV. The Fundamental Group
V. The Homology Groups
VI. Continuous Mappings and the Homology Groups
VII. Barycentric Subdivision and Excision
VIII. The Homology Sequence
IX. Simplicial Complexes
Guide to Further Reading
Index