Theory of Nonlinear Acoustics in Fluids, 2002 Fluid Mechanics and Its Applications Series, Vol. 67

The aim of the present book is to present theoretical nonlinear aco- tics with equal stress on physical and mathematical foundations. We have attempted explicit and detailed accounting for the physical p- nomena treated in the book, as well as their modelling, and the f- mulation and solution of the mathematical models. The nonlinear acoustic phenomena described in the book are chosen to give phy- cally interesting illustrations of the mathematical theory. As active researchers in the mathematical theory of nonlinear acoustics we have found that there is a need for a coherent account of this theory from a unified point of view, covering both the phenomena studied and mathematical techniques developed in the last few decades. The most ambitious existing book on the subject of theoretical nonlinear acoustics is ?Theoretical Foundations of Nonlinear Aco- tics? by O. V. Rudenko and S. I. Soluyan (Plenum, New York, 1977). This book contains a variety of applications mainly described by Bu- ers? equation or its generalizations. Still adhering to the subject - scribed in the title of the book of Rudenko and Soluyan, we attempt to include applications and techniques developed after the appearance of, or not included in, this book. Examples of such applications are resonators, shockwaves from supersonic projectiles and travelling of multifrequency waves. Examples of such techniques are derivation of exact solutions of Burgers? equation, travelling wave solutions of Bu- ers? equation in non-planar geometries and analytical techniques for the nonlinear acoustic beam (KZK) equation.

Physical theory of nonlinear acoustics.- Basic methods of nonlinear acoustics.- Nonlinear waves with zero and vanishing diffusion.- Nonlinear plane diffusive waves.- Nonlinear cylindrical and spherical diffusive waves.- Nonlinear bounded sound beams.- Nonlinear standing waves in closed tubes.

Differs from mathematical books on nonlinear wave equations by its stress on their origin in physical principles and their use for physical applications Differs from books on applications of nonlinear acoustics by its ambition to explain all steps in mathematical derivations of physical results