Helge Kristian Jenssen

Stability of Large-Amplitude Shock Waves of Compressible Navier–Stokes Equations

Abstract We summarize recent progress on one-dimensional and multidimensional stability of viscous shock wave solutions of compressible Navier–Stokes equations and related symmetrizable hyperbolic–parabolic systems, with an emphasis on the large-amplitude regime where transition from stability to instability may be expected to occur. The main result is the establishment of rigorous necessary and sufficient conditions for linearized and nonlinear planar viscous stability, agreeing in one dimension and separated in multidimensions by a co-dimension one set, that both extend and sharpen the formal conditions of structural and dynamical stability found in classical physical literature. The sufficient condition in multidimensions is new, and represents the main mathematical contribution of this article. The sufficient condition for stability is always satisfied for sufficiently small-amplitude shocks, while the necessary condition is known to fail under certain circumstances for sufficiently large-amplitude shocks; both are readily evaluable numerically. The precise conditions under and the nature in which transition from stability to instability occurs are outstanding open questions in the theory. 1

ONE-DIMENSIONAL COMPRESSIBLE FLOW WITH TEMPERATURE DEPENDENT TRANSPORT COEFFICIENTS

We establish the existence of global-in-time weak solutions to the one-dimensional, compressible Navier–Stokes system for a viscous and heat conducting ideal polytropic gas (pressure

On the convergence of Godunov scheme for nonlinear hyperbolic systems

p=K\theta/\tau

Blowup for systems of conservation laws

, internal energy

Gradient driven and singular flux blowup of smooth solutions to hyperbolic systems of conservation laws

e=c_v\theta

No TVD Fields for 1-D Isentropic Gas Flow

) when the viscosity

Pairwise Wave Interactions in Ideal Polytropic Gases

\mu

SYSTEMS OF HYPERBOLIC CONSERVATION LAWS WITH PRESCRIBED EIGENCURVES

is constant and the heat conductivity

Numerical Investigation of Cavitation in Multidimensional Compressible Flows

\kappa

Extensions for Systems of Conservation Laws

depends on the temperature