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Partial Differential Equations H. Bateman
Partial Differential Equations
H. Bateman
PARTIAL DIFFERENTIAL EQUATIONS OF MATHEMATICAL PHYSICS by H. BATEMAN. Originally published in 1932. COntents include: PREFACE page xiii INTRODUCTION xv-xxii CHAPTER I: THE CLASSICAL EQUATIONS 1-11-1-14. Uniform motion, boundary conditions, problems, a passage to the limit. 1-7 1-15-1-19. Fouriers theorem, Fourier constants, Cesaros method of summation, Parsevals theorem, Fourier series, the expansion of the integral of a bounded function which is continuous bit by bit. . 7-16 1-21-1-25. The bending of a beam, the Greens function, the equation of three moments, stability of a strut, end conditions, examples. 16-25 1 31-1-36. F ee undamped vibrations, simple periodic motion, simultaneous linear equations, the Lagrangian equations of motion, normal vibrations, com pound pendulum, quadratic forms, Hermit ian forms, examples. 25-40 1-41-1 - 42. Forced oscillations, residual oscillation, examples. 40-44 1-43. Motion with a resistance proportional to the velocity, reduction to alge braic equ
| Media | Books Hardcover Book (Book with hard spine and cover) |
| Released | November 4, 2008 |
| ISBN13 | 9781443726702 |
| Publishers | Walton Press |
| Pages | 556 |
| Dimensions | 35 × 216 × 140 mm · 848 g |
| Language | English |
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