Multiple Integrals in the Calculus of Variations

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From the reviews: "…the book contains a wealth of material essential to the researcher concerned with multiple integral variational problems and with elliptic partial differential equations. The book not only reports the researches of the author but also the contributions of his contemporaries in the same and related fields. The book undoubtedly will become a standard reference for researchers in these areas. …The book is addressed mainly to mature mathematical analysts. However, any student of analysis will be greatly rewarded by a careful study of this book."

M. R. Hestenes in Journal of Optimization Theory and Applications

"The work intertwines in masterly fashion results of classical analysis, topology, and the theory of manifolds and thus presents a comprehensive treatise of the theory of multiple integral variational problems."

L. Schmetterer in Monatshefte für Mathematik

"The book is very clearly exposed and contains the last modern theory in this domain. A comprehensive bibliography ends the book."

M. Coroi-Nedeleu in Revue Roumaine de Mathématiques Pures et Appliquées

Author(s): Charles B. Morrey Jr. (auth.)
Series: Grundlehren der mathematischen Wissenschaften 130
Edition: 1
Publisher: Springer-Verlag Berlin Heidelberg
Year: 2008

Language: English
Pages: 506
Tags: Mathematics, general

Front Matter....Pages i-ix
Introduction....Pages 1-39
Semi-classical results....Pages 39-62
The spaces H m p and H m p0 ....Pages 62-90
Existence theorems....Pages 90-126
Differentiability of weak solutions....Pages 126-208
Regularity theorems for the solutions of general elliptic systems and boundary value problems....Pages 209-286
A variational method in the theory of harmonic integrals....Pages 286-316
The $$ \overline \partial $$ -Neumann problem on strongly pseudo-convex manifolds....Pages 316-348
Introduction to parametric Integrals; two dimensional problems....Pages 349-400
The higher dimensional plateau problems....Pages 400-493
Back Matter....Pages 494-506