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Partial Differential Equations: An Introduction by Walter A Strauss

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About this book :-
Partial Differential Equations: An Introduction written by Walter A Strauss .
This is an undergraduate textbook. It is designed for juniors and seniors who are science, engineering, or mathematics majors. Graduate students, especially in the sciences, could surely learn from it, but it is in noway conceived of as a graduate text.
Our understanding of the fundamental processes of the natural world is based to a large extent on partial differential equations. Examples are the vibrations of solids, the flow of fluids, the diffusion of chemicals, the spread of heat, the structure of molecules, the interactions of photons and electrons, and the radiation of electromagnetic waves. Partial differential equations also play a central role in modern mathematics, especially in geometry and analysis. The availability of powerful computers is gradually shifting the emphasis in partial differential equations away from the analytical computation of solutions and toward both their numerical analysis and the qualitative theory.
This book provides an introduction to the basic properties of partial differential equations (PDEs) and to the techniques that have proved useful in analyzing them. My purpose is to provide for the student a broad perspective on the subject, to illustrate the rich variety of phenomena encompassed by it, and to impart a working knowledge of the most important techniques of analysis of the solutions of the equations.
One of the most important techniques is the method of separation of variables. Many textbooks heavily emphasize this technique to the point of excluding other points of view. The problem with that approach is that only certain kinds of partial differential equations can be solved by it, whereas others cannot. In this book it plays a very important but not an overriding role. Other texts, which bring in relatively advanced theoretical ideas, require too much mathematical knowledge for the typical undergraduate student. The author has tried to minimize the advanced concepts and the mathematical jargon in this book. However, because partial differential equations is a subject at the forefront of research in modern science, I have not hesitated to mention advanced ideas as further topics for the ambitious student to pursue.
(Walter A Strauss)

Book Detail :-
Title: Partial Differential Equations: An Introduction
Edition: 2nd
Author(s): Walter A Strauss
Publisher: Wiley
Year: 2009
Pages: 466
Type: PDF
Language: English
ISBN: 9780470054567,0470054565,9780470385531,0470385537
Country: US
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About Author :- The author Walter Alexander Strauss was born 1937, is American applied mathematician, specializing in partial differential equations and nonlinear waves.
Walter Strauss graduated in 1958 with an BA in mathematics from Columbia University and in 1959 with an MS from the University of Chicago. He received his Ph.D. from the Massachusetts Institute of Technology in 1962 with thesis Scattering for hyperbolic equations under the supervision of Irving Segal. Strauss was a postdoc for the academic year 1962–1963 at the Université de Paris. He was a visiting assistant professor from 1963 to 1966 at Stanford University. At Brown University he was an associate professor from 1966 to 1971 and a full professor from 1971 to the present.
Walter Strauss has done research on "scattering theory in electromagnetism and acoustics, stability of waves, relativistic Yang-Mills theory, kinetic theory of plasmas, theory of fluids, and water waves.

All Famous Books of this Author :-
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Book Contents :-
Partial Differential Equations: An Introduction written by Walter A Strauss cover the following topics. '
1. Where PDEs Come From
2. Waves and Diffusions
3. Reflections and Sources
4. Boundary Problems
5. Fourier Series
6. Harmonic Functions
7. Green’s Identities and Green’s Functions
8. Computation of Solutions
9. Waves in Space
10. Boundaries in the Plane and in Space
11. General Eigenvalue Problems
12. Distributions and Transforms
13. PDE Problems from Physics
14. Nonlinear PDEs
Answers and Hints to Selected Exercises

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