Oblique Derivative Problems for Elliptic Equations

✍ Scribed by Gary M. Lieberman

Publisher: World Scientific
Year: 2013
Tongue: English
Leaves: 526
Category: Library

No coin nor oath required. For personal study only.

✦ Synopsis

This book gives an up-to-date exposition on the theory of oblique derivative problems for elliptic equations. The modern analysis of shock reflection was made possible by the theory of oblique derivative problems developed by the author. Such problems also arise in many other physical situations such as the shape of a capillary surface and problems of optimal transportation. The author begins the book with basic results for linear oblique derivative problems and work through the theory for quasilinear and nonlinear problems. The final chapter discusses some of the applications. In addition, notes to each chapter give a history of the topics in that chapter and suggestions for further reading.

✦ Table of Contents

Dedication
Preface
Contents
1. Pointwise Estimates
2. Classical Schauder Theory from a Modern Perspective
3. The Miller Barrier and Some Supersolutions for Oblique Derivative Problems
4. Hölder Estimates for First and Second Derivatives
5. Weak Solutions
6. Strong Solutions
7. Viscosity Solutions of Oblique Derivative Problems
8. Pointwise Bounds for Solutions of Problems with Quasilinear Equations
9. Gradient Estimates for General Form Oblique Derivative Problems
10. Gradient Estimates for the Conormal Derivative Problems
11. Higher Order Estimates and Existence of Solutions for Quasilinear Oblique Derivative Problems
12. Oblique Derivative Problems for Fully Nonlinear Elliptic Equations
Bibliography
Index

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