This book is intended for a first course in the calculus of variations, at the senior or beginning graduate level. The reader will learn methods for finding functions that maximize or minimize integrals. The text lays out important necessary and sufficient conditions for extrema in historical order, and it illustrates these conditions with numerous worked-out examples from mechanics, optics, geometry, and other fields.
The exposition starts with simple integrals containing a single independent variable, a single dependent variable, and a single derivative, subject to weak variations, but steadily moves on to more advanced topics, including multivariate problems, constrained extrema, homogeneous problems, problems with variable endpoints, broken extremals, strong variations, and sufficiency conditions. Numerous line drawings clarify the mathematics.
Each chapter ends with recommended readings that introduce the student to the relevant scientific literature and with exercises that consolidate understanding.
eadership:
Undergraduate students interested in the calculus of variations.
Author(s): Mark Kot
Series: Student Mathematical Library 72
Publisher: American Mathematical Society
Year: 2014
Language: English
Pages: C, X, 298, B
Cover
Title page 4
Table of contents 6
Preface 10 Free
1. Introduction 12
2. The First Variation 38
3. Cases and Examples 58
4. Basic Generalizations 80
5. Constraints 118
6. The Second Variation 150
7. Review and Preview 182
8. The Homogeneous Problem 188
9. Variable-Endpoint Conditions 202
10. Broken Extremals 226
11. Strong Variations 246
12. Sufficient Conditions 266
Bibliography 288
Index 306
Back Cover