Systems of Conservation Laws 1: Hyperbolicity, Entropies, Shock Waves

Name: Systems of Conservation Laws 1: Hyperbolicity, Entropies, Shock Waves
Price: $208.79 USD
Availability: InStock
Author: Denis Serre , Translated by I. N. Sneddon
ISBN: 9780521582339

by Denis Serre , Translated by I. N. Sneddon

ISBN13:
9780521582339
ISBN10:
0521582334
Format: Hardcover
Copyright: 1999-06-13
Publisher: Cambridge University Press
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Summary

Systems of conservation laws arise naturally in physics and chemistry. To understand them and their consequences (shock waves, finite velocity wave propagation) properly in mathematical terms requires, however, knowledge of a broad range of topics. This book sets up the foundations of the modern theory of conservation laws describing the physical models and mathematical methods, leading to the Glimm scheme. Building on this the author then takes the reader to the current state of knowledge in the subject. The maximum principle is considered from the viewpoint of numerical schemes and also in terms of viscous approximation. Small waves are studied using geometrical optics methods. Finally, the initial-boundary problem is considered in depth. Throughout, the presentation is reasonably self contained, with large numbers of exercises and full discussion of all the ideas. This makes it an ideal text for graduate courses in the area of partial differential equations.

Acknowledgments

Introduction

xiii

Some models

(24)

Gas dynamics in eulerian variables

(7)

Gas dynamics in lagrangian variables

(2)

The equation of road traffic

(1)

Electromagnetism

(3)

Magneto-hydrodynamics

(3)

Hyperelastic materials

(2)

Singular limits of dispersive equations

(3)

Electrophoresis

(3)

Scalar equations in dimension d = 1

(43)

Classical solutions of the Cauchy problem

(2)

Weak solutions, non-uniqueness

(5)

Entropy solutions, the Kruzkov existence theorem

(11)

The Riemann problem

(2)

The case of f convex. The Lax formula

(2)

Proof of Theorem 2.3.5: existence

(4)

Proof of Theorem 2.3.5: uniqueness

(6)

Comments

(3)

Exercises

(8)

Linear and quasi-linear systems

(38)

Linear hyperbolic systems

(10)

Quasi-linear hyperbolic systems

(1)

Conservative systems

(2)

Entropies, convexity and hyperbolicity

(4)

Weak solutions and entropy solutions

(5)

Local existence of smooth solutions

(10)

The wave equation

101

(5)

Dimension d = 1, the Riemann problem

106

(40)

Generalities on the Riemann problem

106

(1)

The Hugoniot locus

107

(4)

Shock waves

111

(5)

Contact discontinuities

116

(3)

Rarefaction waves. Wave curves

119

(3)

Lax's theorem

122

(5)

The solution of the Riemann problem for the p-system

127

(5)

The solution of the Riemann problem for gas dynamics

132

(11)

Exercises

143

(3)

The Glimm scheme

146

(40)

Functions of bounded variation

146

(3)

Description of the scheme

149

(4)

Consistency

153

(3)

Convergence

156

(5)

Stability

161

(6)

The example of Nishida

167

(7)

2 x 2 Systems with diminishing total variation

174

(3)

Technical lemmas

177

(3)

Supplementary remarks

180

(2)

Exercises

182

(4)

Second order perturbations

186

(34)

Dissipation by viscosity

187

(6)

Global existence in the strictly dissipative case

193

(10)

Smooth convergence as &epsis; &rarrl 0+

203

(7)

Scalar case. Accuracy of approximation

210

(6)

Exercises

216

(4)

Viscosity profiles for shock waves

220

(35)

Typical example of a limit of viscosity solutions

220

(5)

Existence of the viscosity profile for a weak shock

225

(4)

Profiles for gas dynamics

229

(1)

Asymptotic stability

230

(5)

Stability of the profile for a Lax shock

235

(7)

Influence of the diffusion tensor

242

(3)

Case of over-compressive shocks

245

(5)

Exercises

250

(5)

Bibliography

255

(6)

Index

261

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