Partial differential equations : an accessible route through theory and applications
Author(s)
Bibliographic Information
Partial differential equations : an accessible route through theory and applications
(Graduate studies in mathematics, v. 169)
American Mathematical Society, c2015
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Note
Includes bibliographical references (p. 277) and index
Description and Table of Contents
Description
This text on partial differential equations is intended for readers who want to understand the theoretical underpinnings of modern PDEs in settings that are important for the applications without using extensive analytic tools required by most advanced texts. The assumed mathematical background is at the level of multivariable calculus and basic metric space material, but the latter is recalled as relevant as the text progresses.
The key goal of this book is to be mathematically complete without overwhelming the reader, and to develop PDE theory in a manner that reflects how researchers would think about the material. A concrete example is that distribution theory and the concept of weak solutions are introduced early because while these ideas take some time for the students to get used to, they are fundamentally easy and, on the other hand, play a central role in the field. Then, Hilbert spaces that are quite important in the later development are introduced via completions which give essentially all the features one wants without the overhead of measure theory.
There is additional material provided for readers who would like to learn more than the core material, and there are numerous exercises to help solidify one's understanding. The text should be suitable for advanced undergraduates or for beginning graduate students including those in engineering or the sciences.
Table of Contents
Introduction
Where do PDE come from
First order scalar semilinear equations
First order scalar quasilinear equations
Distributions and weak derivatives
Second order constant coefficient PDE: Types and d'Alembert's solution of the wave equation
Properties of solutions of second order PDE: Propagation, energy estimates and the maximum principle
The Fourier transform: Basic properties, the inversion formula and the heat equation
The Fourier transform: Tempered distributions, the wave equation and Laplace's equation
PDE and boundaries
Duhamel's principle
Separation of variables
Inner product spaces, symmetric operators, orthogonality
Convergence of the Fourier series and the Poisson formula on disks
Bessel functions
The method of stationary phase
Solvability via duality
Variational problems
Bibliography
Index
by "Nielsen BookData"