Advances in the Theory of Shock Waves

  • Authors
  • Tai-Ping Liu
  • Guy Métivier
  • Joel Smoller
  • Blake Temple
  • Wen-An Yong
  • Kevin Zumbrun
  • Heinrich Freistühler
  • Anders Szepessy

Part of the Progress in Nonlinear Differential Equations and Their Applications book series (PNLDE, volume 47)

Table of contents

  1. Front Matter
    Pages i-viii
  2. Guy Métivier
    Pages 25-103
  3. Back Matter
    Pages 517-520

About this book


In the field known as "the mathematical theory of shock waves," very exciting and unexpected developments have occurred in the last few years. Joel Smoller and Blake Temple have established classes of shock wave solutions to the Einstein­ Euler equations of general relativity; indeed, the mathematical and physical con­ sequences of these examples constitute a whole new area of research. The stability theory of "viscous" shock waves has received a new, geometric perspective due to the work of Kevin Zumbrun and collaborators, which offers a spectral approach to systems. Due to the intersection of point and essential spectrum, such an ap­ proach had for a long time seemed out of reach. The stability problem for "in­ viscid" shock waves has been given a novel, clear and concise treatment by Guy Metivier and coworkers through the use of paradifferential calculus. The L 1 semi­ group theory for systems of conservation laws, itself still a recent development, has been considerably condensed by the introduction of new distance functionals through Tai-Ping Liu and collaborators; these functionals compare solutions to different data by direct reference to their wave structure. The fundamental prop­ erties of systems with relaxation have found a systematic description through the papers of Wen-An Yong; for shock waves, this means a first general theorem on the existence of corresponding profiles. The five articles of this book reflect the above developments.


Relativity applied mathematics conservation laws general relativity pdes

Editors and affiliations

  • Heinrich Freistühler
    • 1
  • Anders Szepessy
    • 2
  1. 1.Max Planck Institute for Mathematics in the SciencesLeipzigGermany
  2. 2.Department of MathematicsRoyal Institute of TechnologyStockholmSweden

Bibliographic information

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