**Memoirs of the American Mathematical Society**

1993;
79 pp;
Softcover

MSC: Primary 53; 55; 57;

Print ISBN: 978-0-8218-2566-2

Product Code: MEMO/105/504

List Price: $34.00

AMS Member Price: $20.40

MAA Member Price: $30.60

**Electronic ISBN: 978-1-4704-0081-1
Product Code: MEMO/105/504.E**

List Price: $34.00

AMS Member Price: $20.40

MAA Member Price: $30.60

# A Topological Chern-Weil Theory

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*Anthony V. Phillips; David A. Stone*

This work develops a topological analogue of the classical Chern-Weil theory as a method for computing the characteristic classes of principal bundles whose structural group is not necessarily a Lie group, but only a cohomologically finite topological group. Substitutes for the tools of differential geometry, such as the connection and curvature forms, are taken from algebraic topology, using work of Adams, Brown, Eilenberg-Moore, Milgram, Milnor, and Stasheff. The result is a synthesis of the algebraic-topological and differential-geometric approaches to characteristic classes. In contrast to the first approach, specific cocycles are used, so as to highlight the influence of local geometry on global topology. In contrast to the second, calculations are carried out at the small scale rather than the infinitesimal; in fact, this work may be viewed as a systematic extension of the observation that curvature is the infinitesimal form of the defect in parallel translation around a rectangle. This book could be used as a text for an advanced graduate course in algebraic topology.

#### Readership

Research mathematicians and advanced graduate students with an interest in algebraic topology or differential geometry.

#### Table of Contents

# Table of Contents

## A Topological Chern-Weil Theory

- Contents v6 free
- Introduction 18 free
- 1 Combinatorial preliminaries 714 free
- 2 The universal side of the problem: the topological Lie algebra, tensor algebra and invariant polynomials 1926
- 3 Parallel transport functions and principal bundles 2936
- 4 The complex C[sub(*)], the twisting cochain of a parallel transportfunction, and the algebraic classifying map S[sub(*)]:C[sub(*)] → ε[sub(*)] 3340
- 5 Cochains on C[sub(*)] with values in Tg[sub(*)] 4754
- 6 The main theorem 6370
- Appendix. The cobar construction, holonomy, and parallel transport functions 6976
- Bibliography 7784