New to the Third Edition

• New material on the historical development of classical and modern integral transforms
• New sections on Fourier transforms of generalized functions, the Poisson summation formula, the Gibbs phenomenon, and the Heisenberg uncertainty principle
• Revised material on Laplace transforms and double Laplace transforms and their applications
• New examples of applications in mechanical vibrations, electrical networks, quantum mechanics, integral and functional equations, fluid mechanics, mathematical statistics, special functions, and more
• New figures that facilitate a clear understanding of physical explanations
• Updated exercises with solutions, tables of integral transforms, and bibliography

Through numerous examples and end-of-chapter exercises, this book develops readers’ analytical and computational skills in the theory and applications of transform methods. It provides accessible working knowledge of the analytical methods and proofs required in pure and applied mathematics, physics, and engineering, preparing readers for subsequent advanced courses and research in these areas.