Mastodawn

Mir Books Oct 9, 2024

This book aims to equip readers with the mathematical physics skills necessary to solve problems in mechanics, heat conduction, and electromagnetism. It covers a wide range of topics, from basic to advanced, and is intended for both students and researchers. The book provides hints for solving problems and includes detailed solutions to selected ones. Readers should have a solid background in applied mathematics to fully benefit from the book, but most problems in the earlier chapters are accessible to those with a basic understanding of mathematical physics methods.

Translated from the Russian by Richard A. Silverman.

Get the book here.

Contents

PART 1

CONTENTS

PROBLEMS, Page 1

DERIVATION OF EQUATIONS AND FORMULATION OF PROBLEMS, Page 3

Mechanics, 3

Heat Conduction, 9

Electricity and Magnetism, 11

SOME SPECIAL METHODS FOR SOLVING HYPERBOLIC AND ELLIPTIC EQUATIONS, Page 19

Hyperbolic Equations, 19

Elliptic Equations: The Green’s Function Method, 27

Elliptic Equations: The Method of Conformal Mapping, 33

STEADY-STATE HARMONIC OSCILLATIONS, Page 42

Elastic Bodies: Free Oscillations, 43

Elastic Bodies: Forced Oscillations, 46

Electromagnetic Oscillations, 49

THE FOURIER METHOD, Page 55

Mechanics: Vibrating Systems, Acoustics, 60

Mechanics: Statics of Deformable Media, Fluid Dynamics, 73

Heat Conduction: Nonstationary Problems, 77

Heat Conduction: Stationary Problems, 83

Electricity and Magnetism, 91

THE EIGENFUNCTION METHOD FOR SOLVING INHOMOGENEOUS PROBLEMS, Page 103

Mechanics: Vibrating Systems, 107

Mechanics: Statics of Deformable Media, 114

Heat Conduction: Nonstationary Problems, 119

Heat Conduction: Stationary Problems, 124

Electricity and Magnetism, 131

INTEGRAL TRANSFORMS, Page 143

The Fourier Transform, 146

The Hankel Transform, 160

The Laplace Transform, 169

The Mellin Transform, 189

Integral Transforms Involving Cylinder Functions of Imaginary Order, 194

CURVILINEAR COORDINATES, Page 203

Elliptic Coordinates, 204

Parabolic Coordinates, 210

Two-Dimensional Bipolar Coordinates, 212

Spheroidal Coordinates, 219

Paraboloidal Coordinates, 231

Toroidal Coordinates, 233

Three-Dimensional Bipolar Coordinates, 242

Some General Problems on Separation of Variables, 247

INTEGRAL EQUATIONS, Page 253

Diffraction Theory, 254

Electrostatics, 259

PART 2 SOLUTIONS, Page 273

MATHEMATICAL APPENDIX, Page 381

Special Functions Appearing in the Text, 381

Expansions in Series of Orthogonal Functions, 384

Some Definite Integrals Frequently Encountered in the Applications, 386

Expansion of Some Differential Operators in Orthogonal Curvilinear Coordinates, 388

Supplement: VARIATIONAL AND RELATED METHODS, Page 391

Variational Methods, 392
1.1 Formulation of Variational Problems, 392
1.2 The Ritz Method, 396
1.3 Kantorovich’s Method, 401

Related Methods, 404
2.1 Galerkin’s Method, 404
2.2 Collocation, 407
2.3 Least Squares, 411

References, 412

BIBLIOGRAPHY, Page 415

NAME INDEX, Page 423

SUBJECT INDEX, Page 427

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