Hyperbolic Conservation Laws in Continuum Physics (Grundlehren der mathematischen Wissenschaften Book 325)
معرفی کتاب «Hyperbolic Conservation Laws in Continuum Physics (Grundlehren der mathematischen Wissenschaften Book 325)» نوشتهٔ Constantine M. Dafermos (auth.)، منتشرشده توسط نشر Springer-Verlag Berlin Heidelberg در سال 2010. این کتاب در فرمت pdf، زبان انگلیسی ارائه شده است.
This masterly exposition of the mathematical theory of hyperbolic system for conservation laws brings out the intimate connection with continuum thermodynamics, by emphasising issues in which the analysis may reveal something about the physics and, in return, the underlying physical structure may direct and drive the analysis. The reader is expected to have a certain mathematical sophistication and to be familiar with (at least) the rudiments of the qualitative theory of partial differential equations, whereas the required notions from continuum physics are introduced from scratch. The target group of readers would consist of
(a) experts in the mathematical theory of hyperbolic systems of conservation laws who wish to learn about the connection with classical physics;
(b) specialists in continuum mechanics who may need analytical tools;
(c) experts in numerical analysis who wish to learn the underlying mathematical theory; and
(d) analysts and graduate students who seek introduction to the theory of hyperbolic systems of conservation laws.
The 2nd edition contains a new chapter recounting the exciting recent developments on the vanishing viscosity method. Numerous new sections have been incorporated in preexisting chapters, to introduce newly derived results or present older material, omitted in the first edition, whose relevance and importance has been underscored by current trends in research. In addition, a substantal portion of the original text has been revamped so as to streamline the exposition, enrich the collection of examples and improve the notation. The bibliography has been updated and expanded as well, now comprising over one thousand titles.
This is a masterly exposition and an encyclopedic presentation of the theory of hyperbolic conservation laws. It illustrates the essential role of continuum thermodynamics in providing motivation and direction for the development of the mathematical theory while also serving as the principal source of applications. The reader is expected to have a certain mathematical sophistication and to be familiar with (at least) the rudiments of analysis and the qualitative theory of partial differential equations, whereas prior exposure to continuum physics is not required. The target group of readers would consist of (a) experts in the mathematical theory of hyperbolic systems of conservation laws who wish to learn about the connection with classical physics; (b) specialists in continuum mechanics who may need analytical tools; (c) experts in numerical analysis who wish to learn the underlying mathematical theory; and (d) analysts and graduate students who seek introduction to the theory of hyperbolic systems of conservation laws. New to the 3rd edition is an account of the early history of the subject, spanning the period between 1800 to 1957. Also new is a chapter recounting the recent solution of open problems of long standing in classical aerodynamics. Furthermore, the presentation of a number of topics in the previous edition has been revised and brought up to date, and the collection of applications has been substantially enriched. The bibliography, also expanded and updated, now comprises over fifteen hundred titles. [4e de couv.] The aim of this work is to present a broad overview of the theory of hyperbolic c- servation laws, with emphasis on its genetic relation to classical continuum physics. It was originally published a decade ago, and a second, revised edition appeared in 2005. It is a testament to the vitality of the?eld that in order to keep up with - cent developments it has become necessary to prepare a substantially expanded and updated new edition. A new chapter has been added, recounting the exciting recent developmentsin classical open problems in compressible?uid?ow. Still another - dition is an account of the early history of the subject, which had an interesting, - multuous childhood. Furthermore, a substantial portion of the original text has been reorganized so as to streamline the exposition, update the information, and enrich the collection of examples. In particular, Chapter V has been completely revised. The bibliography has been updated and expanded as well, now comprising over - teenhundred titles. The background, scope, and plan of the book are outlined in the Introduction, following this preface. Geometric measure theory, functional analysis and dynamical systems provide the necessary tools in the theory of hyperbolic conservation laws, but to a great - tent the analysis employscustom-madetechniques,with strong geometric?avor, - derscoring wave propagation and wave interactions. This may leave the impression that the area is insular, detached from the mainland of partial differential equations. Front Matter....Pages i-xxxv Balance Laws....Pages 1-24 Introduction to Continuum Physics....Pages 25-51 Hyperbolic Systems of Balance Laws....Pages 53-74 The Cauchy Problem....Pages 75-96 Entropy and the Stability of Classical Solutions....Pages 97-144 The L 1 Theory for Scalar Conservation Laws....Pages 145-194 Hyperbolic Systems of Balance Laws in One-Space Dimension....Pages 195-229 Admissible Shocks....Pages 231-269 Admissible Wave Fans and the Riemann Problem....Pages 271-324 Generalized Characteristics....Pages 325-330 Genuinely Nonlinear Scalar Conservation Laws....Pages 331-372 Genuinely Nonlinear Systems of Two Conservation Laws....Pages 373-433 The Random Choice Method....Pages 435-475 The Front Tracking Method and Standard Riemann Semigroups....Pages 477-515 Construction of BV Solutions by the Vanishing Viscosity Method....Pages 517-543 Compensated Compactness....Pages 545-571 Conservation Laws in Two Space Dimensions....Pages 573-596 Back Matter....Pages 597-708 Constantine M. Dafermos. Includes Bibliographical References (p. [597]-691) And Indexes.