Equations Of Mathematical Physics
Author: A. V. Bitsadze
Added by: mirtitles
Added Date: 2013-09-17
Language: eng
Subjects: mathematical physics, physics, equations, differential equations, elliptical, parabolic, hyperbolic, cauchy riemann conditions, analysis, functions, special functions, integral equations, green's functions
Publishers: Mir Publishers
Collections: mir-titles, additional collections
Pages Count: 300
PPI Count: 300
PDF Count: 1
Total Size: 44.85 MB
PDF Size: 8.28 MB
Extensions: torrent, djvu, epub, gif, pdf, gz, zip
Year: 1980
Contributor: Mirtitles
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Description
The present book consists of an introduction and six chapters. The introduction discusses basic notions and definitions of the traditional course of mathematical physics and also mathematical models of some phenomena in physics and engineering. Chapters 1 and 2
are devoted to elliptic partial differential equations. Here much emphasis is placed on the Cauchy- Riemann system of partial differential equations, that is on fundamentals of the theory of analytic functions, which facilitates the understanding of the role played in mathematical physics by the theory of functions of a complex variable.In Chapters 3 and 4 the structural properties of the solutions of hyperbolic and parabolic partial differential equations are studied and much attention is paid to basic problems of the theory of wave equation and heat conduction equation.
In Chapter 5 some elements of the theory of linear integral equations are given. A separate section of this chapter is devoted to singular
integral equations which are frequently used in applications. Chapter 6 is devoted to basic practical methods for the solution of partial differential equations. This chapter contains a number of typical examples demonstrating the essence of the Fourier method of separation of variables, the method of integral transformations, the finite difference method, the melthod of asymptotic expansions and also the variational methods.To study the book it is sufficient for the reader to be familiar with an ordinary classical course on mathematical analysis studied in colleges. Since such a course usually does not involve functional analysis, the embedding theorems for function' spaces are not included in the present book.
The book was translated from the Russian by V. M. Volosov and I. G. Volosova and was first published by Mir Publishers in 1980.