Introduction to Various Aspects of Degree Theory in Banach Spaces
Author:   E.H. Rothe
Publisher:   American Mathematical Society
Volume:   No. 23
ISBN:  

9780821827703


Pages:   242
Publication Date:   01 March 2001
Format:   Paperback
Availability:   Temporarily unavailable   Availability explained
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Introduction to Various Aspects of Degree Theory in Banach Spaces


Overview

Since its development by Leray and Schauder in the 1930's, degree theory in Banach spaces has proved to be an important tool in tackling many analytic problems, including boundary value problems in ordinary and partial differential equations, integral equations, and eigenvalue and bifurcation problems. With this volume E. H. Rothe provides a largely self-contained introduction to topological degree theory, with an emphasis on its function-analytical aspects. He develops the definition and properties of the degree as much as possible directly in Banach space, without recourse to finite-dimensional theory. A basic tool used is a homotopy theorem for certain linear maps in Banach spaces which allows one to generalize the distinction between maps with positive determinant and those with negative determinant in finite-dimensional spaces. Rothe's book is addressed to graduate students who may have only a rudimentary knowledge of Banach space theory. The first chapter on function-analytic preliminaries provides most of the necessary background. For the benefit of less experienced mathematicians, Rothe introduces the topological tools (subdivision and simplicial approximation, for example) only to the degree of abstraction necessary for the purpose at hand. Readers will gain insight into the various aspects of degree theory, experience in function-analytic thinking, and a theoretic base for applying degree theory to analysis. Rothe describes the various approaches that have historically been taken towards degree theory, making the relationships between these approaches clear. He treats the differential method, the simplicial approach introduced by Brouwer in 1911, the Leray-Schauder method (which assumes Brouwer's degree theory for the finite-dimensional space and then uses a limit process in the dimension), and attempts to establish degree theory in Banach spaces intrinsically, by an application of the differential method in the Banach space case.

Full Product Details

Author:   E.H. Rothe
Publisher:   American Mathematical Society
Imprint:   American Mathematical Society
Volume:   No. 23
Weight:   0.450kg
ISBN:  

9780821827703


ISBN 10:   0821827707
Pages:   242
Publication Date:   01 March 2001
Audience:   College/higher education ,  Professional and scholarly ,  Undergraduate ,  Postgraduate, Research & Scholarly
Format:   Paperback
Publisher's Status:   Active
Availability:   Temporarily unavailable   Availability explained
The supplier advises that this item is temporarily unavailable. It will be ordered for you and placed on backorder. Once it does come back in stock, we will ship it out to you.

Table of Contents

Function-analytic preliminaries; The Leray-Schauder degree for differentiable maps; The Leray-Schauder degree for not necessarily differentiable maps; The Poincare--Bohl theorem and some of its applications; The product theorem and some of its consequences; The finite-dimensional case; On spheres; Some extension and homotopy theorems; The Borsuk theorem and some of its consequences; The linear homotopy theorem; Proof of the Sard-Smale theorem

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