ZZ/2, homotopy theory / M.C. Crabb.

Format:

• Book

Author/Creator:

• Crabb, M. C. (Michael Charles), author.

Series:

• London Mathematical Society lecture note series ; 44.
• London Mathematical Society lecture note series ; 44

Language:

English

Subjects (All):

• Homotopy theory.
• Group theory.
• Symmetry.

Physical Description:

1 online resource (128 pages) : digital, PDF file(s).

Place of Publication:

Cambridge : Cambridge University Press, 1980.

Language Note:

English

Summary:

This account is a study of twofold symmetry in algebraic topology. The author discusses specifically the antipodal involution of a real vector bundle - multiplication by - I in each fibre; doubling and squaring operations; the symmetry of bilinear forms and Hermitian K-theory. In spite of its title, this is not a treatise on equivariant topology; rather it is the language in which to describe the symmetry. Familiarity with the basic concepts of algebraic topology (homotopy, stable homotopy, homology, K-theory, the Pontrjagin-Thom transfer construction) is assumed. Detailed proofs are not given (the expert reader will be able to supply them when necessary) yet nowhere is credibility lost. Thus the approach is elementary enough to provide an introduction to the subject suitable for graduate students although research workers will find here much of interest.

Contents:

Cover; Title; Copyright; Contents; Acknowledgments; 1. Introduction; 2. The Euler class and obstruction theory; 3. Spherical fibrations; 4. Stable cohomotopy; 5. Framed manifolds; 6. K-theory; 7. The image of J; 8. The Euler characteristic; 9. Topological Hermitian K-theory; 10. Algebraic Hermitian K-theory; B. Appendix: On the Hermitian J-homomorphism; Bibliography; Index

Notes:

• Title from publisher's bibliographic system (viewed on 05 Oct 2015).
• Includes bibliographical references (p. 121-126) and index.

ISBN:

• 1-139-88396-8
• 1-107-36597-X
• 1-107-37070-1
• 1-107-36106-0
• 1-107-36978-9
• 1-299-40378-6
• 1-107-36351-9
• 0-511-66269-6