Bernard Dacorogna9781860944994, 1-86094-499-X
This book serves both as a guide to the expansive existing literature and as an aid to the non-specialist — mathematicians, physicists, engineers, students or researchers — in discovering the subjects most important problems, results and techniques. Despite the aim of addressing non-specialists, mathematical rigor has not been sacrificed; most of the theorems are either fully proved or proved under more stringent conditions.
The book, containing more than seventy exercises with detailed solutions, is well designed for a course both at the undergraduate and graduate levels.
Table of contents :
Introduction to the calculus of variations……Page 5
Contents……Page 6
Preface to the English Edition……Page 10
0.1 Brief historical comments……Page 14
0.2 Model problem and some examples……Page 16
0.3 Presentation of the content of the mono-graph……Page 20
1.1 Introduction……Page 24
1.2 Continuous and Hölder continuous functions……Page 25
1.3 Lp spaces……Page 29
1.4 Sobolev spaces……Page 38
1.5 Convex analysis……Page 53
2.1 Introduction……Page 58
2.2 Euler-Lagrange equation……Page 60
2.3 Second form of the Euler-Lagrange equation……Page 72
2.4 Hamiltonian formulation……Page 74
2.5 Hamilton-Jacobi equation……Page 82
2.6 Fields theories……Page 85
3.1 Introduction……Page 92
3.2 The model case: Dirichlet integral……Page 94
3.3 A general existence theorem……Page 97
3.4 Euler-Lagrange equations……Page 105
3.5 The vectorial case……Page 111
3.6 Relaxation theory……Page 120
4.1 Introduction……Page 124
4.2 The one dimensional case……Page 125
4.3 The model case: Dirichlet integral……Page 130
4.4 Some general results……Page 137
5.1 Introduction……Page 140
5.2 Generalities about surfaces……Page 143
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