Functional Analysis, Sobolev Spaces and Partial Differential Equations

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Uniquely, this book presents a coherent, concise and unified way of combining elements from two distinct “worlds,” functional analysis (FA) and partial differential equations (PDEs), and is intended for students who have a good background in real analysis. This text presents a smooth transition from FA to PDEs by analyzing in great detail the simple case of one-dimensional PDEs (i.e., ODEs), a more manageable approach for the beginner. Although there are many books on functional analysis and many on PDEs, this is the first to cover both of these closely connected topics. Moreover, the wealth of exercises and additional material presented, leads the reader to the frontier of research. This book has its roots in a celebrated course taught by the author for many years and is a completely revised, updated, and expanded English edition of the important “Analyse Fonctionnelle” (1983). Since the French book was first published, it has been translated into Spanish, Italian, Japanese, Korean, Romanian, Greek and Chinese. The English version is a welcome addition to this list. The first part of the text deals with abstract results in FA and operator theory. The second part is concerned with the study of spaces of functions (of one or more real variables) having specific differentiability properties, e.g., the celebrated Sobolev spaces, which lie at the heart of the modern theory of PDEs. The Sobolev spaces occur in a wide range of questions, both in pure and applied mathematics, appearing in linear and nonlinear PDEs which arise, for example, in differential geometry, harmonic analysis, engineering, mechanics, physics etc. and belong in the toolbox of any graduate student studying analysis.

Author(s): Haim Brezis (auth.)
Series: Universitext
Edition: 1
Publisher: Springer-Verlag New York
Year: 2010

Language: English
Pages: 600
City: NY
Tags: Functional Analysis; Partial Differential Equations

Front Matter....Pages 1-1
The Hahn–Banach Theorems. Introduction to the Theory of Conjugate Convex Functions....Pages 1-29
The Uniform Boundedness Principle and the Closed Graph Theorem....Pages 31-54
Weak Topologies. Reflexive Spaces. Separable Spaces. Uniform Convexity....Pages 55-87
L p Spaces....Pages 89-130
Hilbert Spaces....Pages 131-156
Compact Operators. Spectral Decomposition of Self-Adjoint Compact Operators....Pages 157-179
The Hille–Yosida Theorem....Pages 181-199
Sobolev Spaces and the Variational Formulation of Boundary Value Problems in One Dimension....Pages 201-261
Sobolev Spaces and the Variational Formulation of Elliptic Boundary Value Problems in N Dimensions....Pages 263-323
Evolution Problems: The Heat Equation and the Wave Equation....Pages 325-347
Miscellaneous Complements....Pages 349-370
Back Matter....Pages 365-365