Boundary Value Problems of Mathematical Physics. IX
Title | Boundary Value Problems of Mathematical Physics. IX PDF eBook |
Author | Olga Alexandrovna Ladyzhenskaya |
Publisher | American Mathematical Soc. |
Pages | 186 |
Release | 1977 |
Genre | Boundary value problems |
ISBN | 9780821830277 |
Boundary Value Problems of Mathematical Physics
Title | Boundary Value Problems of Mathematical Physics PDF eBook |
Author | Ivar Stakgold |
Publisher | SIAM |
Pages | 1156 |
Release | 2000-06-30 |
Genre | Science |
ISBN | 0898714567 |
For more than 30 years, this two-volume set has helped prepare graduate students to use partial differential equations and integral equations to handle significant problems arising in applied mathematics, engineering, and the physical sciences. Originally published in 1967, this graduate-level introduction is devoted to the mathematics needed for the modern approach to boundary value problems using Green's functions and using eigenvalue expansions. Now a part of SIAM's Classics series, these volumes contain a large number of concrete, interesting examples of boundary value problems for partial differential equations that cover a variety of applications that are still relevant today. For example, there is substantial treatment of the Helmholtz equation and scattering theory?subjects that play a central role in contemporary inverse problems in acoustics and electromagnetic theory.
Boundary Value Problems of Mathematical Physics
Title | Boundary Value Problems of Mathematical Physics PDF eBook |
Author | Olga Aleksandrovna Ladyzhenskaëiìa |
Publisher | |
Pages | 213 |
Release | 1981 |
Genre | |
ISBN |
Boundary Value Problems of Mathematical Physics
Title | Boundary Value Problems of Mathematical Physics PDF eBook |
Author | Dmitriĭ Evgenʹevich Menʹshov |
Publisher | |
Pages | 224 |
Release | 1980 |
Genre | Algebra |
ISBN | 9780821830024 |
Boundary Value Problems of Mathematical Physics
Title | Boundary Value Problems of Mathematical Physics PDF eBook |
Author | |
Publisher | |
Pages | |
Release | 1983 |
Genre | |
ISBN | 9789995780302 |
Boundary and Eigenvalue Problems in Mathematical Physics
Title | Boundary and Eigenvalue Problems in Mathematical Physics PDF eBook |
Author | Hans Sagan |
Publisher | Courier Corporation |
Pages | 420 |
Release | 2012-04-26 |
Genre | Science |
ISBN | 0486150925 |
Well-known text uses a few basic concepts to solve such problems as the vibrating string, vibrating membrane, and heat conduction. Problems and solutions. 31 illustrations.
The Boundary Value Problems of Mathematical Physics
Title | The Boundary Value Problems of Mathematical Physics PDF eBook |
Author | O.A. Ladyzhenskaya |
Publisher | Springer Science & Business Media |
Pages | 350 |
Release | 2013-03-14 |
Genre | Science |
ISBN | 1475743173 |
In the present edition I have included "Supplements and Problems" located at the end of each chapter. This was done with the aim of illustrating the possibilities of the methods contained in the book, as well as with the desire to make good on what I have attempted to do over the course of many years for my students-to awaken their creativity, providing topics for independent work. The source of my own initial research was the famous two-volume book Methods of Mathematical Physics by D. Hilbert and R. Courant, and a series of original articles and surveys on partial differential equations and their applications to problems in theoretical mechanics and physics. The works of K. o. Friedrichs, which were in keeping with my own perception of the subject, had an especially strong influence on me. I was guided by the desire to prove, as simply as possible, that, like systems of n linear algebraic equations in n unknowns, the solvability of basic boundary value (and initial-boundary value) problems for partial differential equations is a consequence of the uniqueness theorems in a "sufficiently large" function space. This desire was successfully realized thanks to the introduction of various classes of general solutions and to an elaboration of the methods of proof for the corresponding uniqueness theorems. This was accomplished on the basis of comparatively simple integral inequalities for arbitrary functions and of a priori estimates of the solutions of the problems without enlisting any special representations of those solutions.