Degree Theory In Analysis And Applications Hardcover
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Author 1
Irene Fonseca
Book Description
In this book we study the degree theory and some of its applications in analysis. It focuses on the recent developments of this theory for Sobolev functions, which distinguishes this book from the currently available literature. We begin with a thorough study of topological degree for continuous functions. The contents of the book include: degree theory for continuous functions, the multiplication theorem, Hopf`s theorem, Brower`s fixed point theorem, odd mappings, Jordan`s separation theorem. Following a brief review of measure theory and Sobolev functions and study local invertibility of Sobolev functions. These results are put to use in the study variational principles in nonlinear elasticity. The Leray-Schauder degree in infinite dimensional spaces is exploited to obtain fixed point theorems. We end the book by illustrating several applications of the degree in the theories of ordinary differential equations and partial differential equations.
ISBN-10
0198511965
ISBN-13
9780198511960
Language
English
Publisher
Oxford University Press
Publication Date
14 December 1995
Number of Pages
220
Author 2
Wilfrid Gangbo
Editorial Review
...recommended both to graduate students, as well as to more specialized researchers. * SIAM Review, Vol. 39, no.3, September 1997 * The book brings together many results previously to be found only in journals. * Alsib Book Guide, vol.61, no.5, May 1996. *