Antonio Ambrosetti David Arcoya Álvarez Ambrosetti An Introduction to Nonlinear Functional Analysis and Elliptic Problems

An Introduction to Nonlinear Functional Analysis and Elliptic Problems

von Antonio Ambrosetti David Arcoya Álvarez

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Beschreibung

This self-contained textbook provides the basic, abstract tools used in nonlinear analysis and their applications to semilinear elliptic boundary value problems. By first outlining the advantages and disadvantages of each method, this comprehensive text displays how various approaches can easily be applied to a range of model cases.

An Introduction to Nonlinear Functional Analysis and Elliptic Problems is divided into two parts: the first discusses key results such as the Banach contraction principle, a fixed point theorem for increasing operators, local and global inversion theory, Leray–Schauder degree, critical point theory, and bifurcation theory; the second part shows how these abstract results apply to Dirichlet elliptic boundary value problems.  The exposition is driven by numerous prototype problems and exposes a variety of approaches to solving them.

Complete with a preliminary chapter, an appendix that includes further results on weak derivatives, and chapter-by-chapter exercises, this book is a practical text for an introductory course or seminar on nonlinear functional analysis.


This self-contained textbook provides the basic, abstract tools used in nonlinear analysis and their applications to semilinear elliptic boundary value problems. By first outlining the advantages and disadvantages of each method, this comprehensive text displays how various approaches can easily be applied to a range of model cases.

An Introduction to Nonlinear Functional Analysis and Elliptic Problems is divided into two parts: the first discusses key results such as the Banach contraction principle, a fixed point theorem for increasing operators, local and global inversion theory, Leray–Schauder degree, critical point theory, and bifurcation theory; the second part shows how these abstract results apply to Dirichlet elliptic boundary value problems. The exposition is driven by numerous prototype problems and exposes a variety of approaches to solving them.

Complete with a preliminary chapter, an appendix that includes further results on weak derivatives, and chapter-by-chapter exercises, this book is a practical text for an introductory course or seminar on nonlinear functional analysis.


Provides the basic, abstract tools used in nonlinear analysis Key results such as the Banach contraction principle, a fixed point theorem for increasing operators, local and global inversion theory, Leray--Schauder degree, critical point theory, and bifurcation theory Outlines a variety of approaches and displays how they can easily be applied to a range of model cases Clear exposition driven by numerous prototype problems An extensive appendix that includes further results on weak derivatives Includes supplementary material: sn.pub/extras

Autor*in

Antonio Ambrosetti

Themen in »An Introduction to Nonlinear Functional Analysis and Elliptic Problems«

Leray--Schauder topological degree bifurcation theory critical points elliptic problems fixed point theorem global inversion theorems nonlinear functional analysis quasilinear problems suprelinear problems partial differential equations

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From the reviews:

“The book is devoted to nonlinear functional analysis and its applications to semilinear elliptic boundary value problems. It covers a great variety of topics and gives a good introduction to the subject. … The book is aimed at graduate and senior undergraduate students.” (Alexander A. Pankov, Mathematical Reviews, Issue 2012 f)

“This book provides some basic abstract tools used in modern nonlinear analysis in strong relationship with their applications to semilinear elliptic boundary value problems. … This monograph is suitable for graduate students and researchers … . the volume under review should certainly be in the library of every university where research in mathematics is conducted.” (Vicenţiu D. Rădulescu, Zentralblatt MATH, Vol. 1228, 2012)


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Details

ISBN: 9780817681142
Verlag: Birkhäuser Boston
Erscheinung: 19.07.2011

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