Equivariant surgery theories and their periodicity properties
Author(s)
Bibliographic Information
Equivariant surgery theories and their periodicity properties
(Lecture notes in mathematics, 1443)
Springer-Verlag, c1990
- : gw
- : us
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Note
Includes bibliographical references and indexes
Description and Table of Contents
Description
The theory of surgery on manifolds has been generalized to categories of manifolds with group actions in several different ways. This book discusses some basic properties that such theories have in common. Special emphasis is placed on analogs of the fourfold periodicity theorems in ordinary surgery and the roles of standard general position hypotheses on the strata of manifolds with group actions. The contents of the book presuppose some familiarity with the basic ideas of surgery theory and transformation groups, but no previous knowledge of equivariant surgery is assumed. The book is designed to serve either as an introduction to equivariant surgery theory for advanced graduate students and researchers in related areas, or as an account of the authors' previously unpublished work on periodicity for specialists in surgery theory or transformation groups.
Table of Contents
Summary: Background material and basic results.- to equivariant surgery.- Relations between equivariant surgery theories.- Periodicity theorems in equivariant surgery.- Twisted product formulas for surgery with coefficients.- Products and periodicity for surgery up to pseudoequivalence.
by "Nielsen BookData"