Projective Differential Geometry Old and New

All titles

From the Schwarzian Derivative to the Cohomology of Diffeomorphism Groups

Series:

Cambridge Tracts in Mathematics

Author:

V. Ovsienko, Université Lyon I
S. Tabachnikov, Pennsylvania State University

Published:

December 2004

Availability:

Available

Format:

Hardback

ISBN:

9780521831864

$142.00

USD

Hardback

$142.00 USD

eBook

Description

Ideas of projective geometry keep reappearing in seemingly unrelated fields of mathematics. This book provides a rapid route for graduate students and researchers to contemplate the frontiers of contemporary research in this classic subject. The authors include exercises and historical and cultural comments relating the basic ideas to a broader context.

Presents and summarizes recent research scattered in mathematical journals, and features historical, cultural and bibliographical comments collected at the end of each section
Numerous exercises help the reader to master basic techniques and make it possible to avoid lengthy computation in the text of the book
A unique feature of this book is that it puts classical projective differential geometry into a broader mathematical context and connects it with contemporary mathematics and mathematical physics

Reviews & endorsements

"... [a] remarkable book [with] absolute autonomy and a priceless tool for students and researchers. Moreover, the writing style used here makes the reading truly enjoyable and enlightening."
Laurent Guieu, Mathematical Reviews

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Product details

Published: December 2004
Format: Hardback
ISBN: 9780521831864
Length: 262 pages
Dimensions: 235 × 160 × 20 mm
Weight: 0.497kg
Contains: 53 b/w illus. 35 exercises
Availability: Available

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Contents

Preface: why projective?
1. Introduction
2. The geometry of the projective line
3. The algebra of the projective line and cohomology of Diff(S1)
4. Vertices of projective curves
5. Projective invariants of submanifolds
6. Projective structures on smooth manifolds
7. Multi-dimensional Schwarzian derivatives and differential operators
Appendix 1. Five proofs of the Sturm theorem
Appendix 2. The language of symplectic and contact geometry
Appendix 3. The language of connections
Appendix 4. The language of homological algebra
Appendix 5. Remarkable cocycles on groups of diffeomorphisms
Appendix 6. The Godbillon–Vey class
Appendix 7. The Adler–Gelfand–Dickey bracket and infinite-dimensional Poisson geometry
Bibliography
Index.

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About the authors

Authors

V. Ovsienko , Université Lyon I
S. Tabachnikov , Pennsylvania State University

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