
This book provides a comprehensive introduction to the mathematical theory of compressible flow, describing both inviscid and viscous compressible flow, which are governed by the Euler and Navier-Stokes equations respectively. The method of presentation allows readers with different backgrounds to focus on various modules of the material, either in part or more fully. Chapters include detailed heuristic arguments providing motivation for technical details that are rigorously presented later on in the text. This especially concerns the existence theory for steady and unsteady Navier-Stokes equations of isentropic compressible flow, and two by two systems of Euler equations in one space dimension. These parts are presented in a textbook style with auxiliary material in supporting sections and appendices. The book includes a rich index and an extensive bibliography, which allow quick orientation on the book itself as well as in the vast literature about the mathematical theory of compressible flow.
This book investigates the rigorous mathematical foundations and existence theories governing both inviscid and viscous compressible fluid flows. Authors Antonín Novotný and Ivan Straškraba utilize their expertise in partial differential equations to bridge the gap between heuristic physical motivation and formal mathematical proof. The text provides a structured framework for analyzing the Euler and Navier-Stokes equations, specifically focusing on isentropic compressible flow models.
What You Will Find
Experts recognize this volume as a specialized resource for graduate-level study in mathematical physics and fluid mechanics. Readers frequently note the high level of technical density, which requires a strong background in analysis to fully utilize the provided proofs and derivations.
Page Count:
528
Publication Date:
2004-08-26
Publisher:
Oxford University Press
ISBN-10:
0198530846
ISBN-13:
9780198530848
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