Hyperbolic Problems: Theory, Numerics, Applications : Tenth International Conference in Osaka, September 2004, Volume 1Fumioki Asakura |
Contents
Plenary Talks | 1 |
The Geometric Approach to Nonlinear Hyperbolic Systems | 15 |
Contact Discontinuity for Compressible NavierStokes Equations | 17 |
Copyright | |
54 other sections not shown
Common terms and phrases
1-shock Anal approximation assume Big Bang black hole boundary conditions bounded Bressan carbuncle Cauchy problem computation conservation laws consider constant convergence defined denote density discontinuous discrete domain dynamics E-mail address eigenvalues entropy entropy solutions equilibrium estimate Euler equations existence finite flow fluid flux FRW metric function Glimm global graph solution Hubble length hyperbolic systems inequality initial data instability Lemma linear Lipschitz Lipschitz continuous Math mathematical method metric Nash equilibrium Navier-Stokes Navier-Stokes equations nonlinear nozzle numerical obtain P.G. LEFLOCH P₁ parameter parametrized graph perturbation phase Phys pressure proof Pure Appl rarefaction Rational Mech Riemann problem Riemann solution satisfy scalar scheme shock curves shock wave SIAM smooth space speed stability stationary solution systems of conservation Theorem theory transonic U₁ unique variables vector velocity viscosity well-posedness Zumbrun