Book contents
- Frontmatter
- Contents
- Preface
- 0 Sets and groups
- 1 Background: metric spaces
- 2 Topological spaces
- 3 Continuous functions
- 4 Induced topology
- 5 Quotient topology (and groups acting on spaces)
- 6 Product spaces
- 7 Compact spaces
- 8 Hausdorff spaces
- 9 Connected spaces
- 10 The pancake problems
- 11 Manifolds and surfaces
- 12 Paths and path connected spaces
- 12A The Jordan curve theorem
- 13 Homotopy of continuous mappings
- 14 ‘Multiplication’ of paths
- 15 The fundamental group
- 16 The fundamental group of a circle
- 17 Covering spaces
- 18 The fundamental group of a covering space
- 19 The fundamental group of an orbit space
- 20 The Borsuk-Ulam and ham-sandwich theorems
- 21 More on covering spaces: lifting theorems
- 22 More on covering spaces: existence theorems
- 23 The Seifert-Van Kampen theorem: I Generators
- 24 The Seifert-Van Kampen theorem: II Relations
- 25 The Seifert-Van Kampen theorem: III Calculations
- 26 The fundamental group of a surface
- 27 Knots: I Background and torus knots
- 28 Knots: II Tame knots
- 28A Table of knots
- 29 Singular homology: an introduction
- 30 Suggestions for further reading
- Index
- Frontmatter
- Contents
- Preface
- 0 Sets and groups
- 1 Background: metric spaces
- 2 Topological spaces
- 3 Continuous functions
- 4 Induced topology
- 5 Quotient topology (and groups acting on spaces)
- 6 Product spaces
- 7 Compact spaces
- 8 Hausdorff spaces
- 9 Connected spaces
- 10 The pancake problems
- 11 Manifolds and surfaces
- 12 Paths and path connected spaces
- 12A The Jordan curve theorem
- 13 Homotopy of continuous mappings
- 14 ‘Multiplication’ of paths
- 15 The fundamental group
- 16 The fundamental group of a circle
- 17 Covering spaces
- 18 The fundamental group of a covering space
- 19 The fundamental group of an orbit space
- 20 The Borsuk-Ulam and ham-sandwich theorems
- 21 More on covering spaces: lifting theorems
- 22 More on covering spaces: existence theorems
- 23 The Seifert-Van Kampen theorem: I Generators
- 24 The Seifert-Van Kampen theorem: II Relations
- 25 The Seifert-Van Kampen theorem: III Calculations
- 26 The fundamental group of a surface
- 27 Knots: I Background and torus knots
- 28 Knots: II Tame knots
- 28A Table of knots
- 29 Singular homology: an introduction
- 30 Suggestions for further reading
- Index
Summary
This book provides a variety of self-contained introductory courses on algebraic topology for the average student. It has been written with a geometric flavour and is profusely illustrated (after all, topology is a branch of geometry). Abstraction has been avoided as far as possible and in general a pedestrian approach has been taken in introducing new concepts. The prerequisites have been kept to a minimum and no knowledge of point set or general topology is assumed, making it especially suitable for a first course in topology with the main emphasis on algebraic topology. Using this book, a lecturer will have much freedom in designing an undergraduate or low level postgraduate course.
Throughout the book there are numerous exercises of varying degree to aid and tax the reader. It is, of course, advisable to do as many of these exercises as possible. However, it is not necessary to do any of them, because rarely at any stage is it assumed that the reader has solved the exercises; if a solution to an exercise is needed in the text then it is usually given.
The contents of this book contain topics from topology and algebraic topology selected for their ‘teachability’; these are possibly the more elegant parts of the subject. Ample suggestions for further reading are given in the last chapter.
Roughly one-quarter of the book is on general topology and three-quarters on algebraic topology. The general topology part of the book is not presented with its usual pathologies. Sufficient material is covered to enable the reader to quickly get to the ‘interesting’ part of topology. In the algebraic topology part, the main emphasis is on the fundamental group of a space.
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- Chapter
- Information
- A First Course in Algebraic Topology , pp. vii - viiiPublisher: Cambridge University PressPrint publication year: 1980