Fourier TransformsCourier Corporation, 01.01.1995 - 542 Seiten Focusing on applications rather than theory, this book examines the theory of Fourier transforms and related topics. Suitable for students and researchers interested in the boundary value problems of physics and engineering, its accessible treatment assumes no specialized knowledge of physics; however, a background in advanced calculus is assumed. 1951 edition. |
Inhalt
CHAPTER | 1 |
CHAPTER 3 | 71 |
CHAPTER 4 | 92 |
CHAPTER 5 | 159 |
CHAPTER 6 | 206 |
CHAPTER 7 | 267 |
APPLICATIONS TO ATOMIC AND NUCLEAR PHYSICS | 327 |
CHAPTER 9 | 395 |
CHAPTER 10 | 450 |
APPENDIX | 511 |
| 533 | |
Andere Ausgaben - Alle anzeigen
Häufige Begriffe und Wortgruppen
applied assume atomic axis Bessel functions boundary conditions boundary value problem calculated Chap components of stress consider constant cosh crack cylinder denotes derived determined displacement displacement vector distribution of stress dx dy elastic electron energy equa evaluated expression Faltung theorem finite Hankel transform fluid follows from equation force formula Fourier sine transform Fourier transform function f(x Hankel transform infinite initial conditions integral equations integral transforms integrating with respect Laplace transform medium Mellin transform method Multiplying both sides neutrons obtain ordinary differential equation plane plate pressure result roots of equation semiinfinite shearing stress sides of equation Similarly sinh solution of equation solve Substituting from equation surface temperature tend to zero theory tion variable variation velocity vibrations write σ₂ მე მყ