Computation of discontinuous solutions of fluid dynamics equations with entropy nondecrease guarantee

A new formulation of the Godunov scheme with linear Riemann problems is proposed that guarantees a nondecrease in entropy. The new version of the method is described for the simplest example of one-dimensional gas dynamics in Lagrangian coordinates.

[1]  Symmetric hyperbolic equations in the nonlinear elasticity theory , 2008 .

[2]  Ilya Peshkov,et al.  Thermodynamically consistent nonlinear model of elastoplastic Maxwell medium , 2010 .

[3]  A. Kulikovskii,et al.  Mathematical Aspects of Numerical Solution of Hyperbolic Systems , 1998, physics/9807053.

[4]  Derek M. Causon,et al.  On the Choice of Wavespeeds for the HLLC Riemann Solver , 1997, SIAM J. Sci. Comput..

[5]  S. Godunov,et al.  Numerical and experimental simulation of wave formation during explosion welding , 2013, Proceedings of the Steklov Institute of Mathematics.

[6]  G. Prokopov Necessity of entropy control in gasdynamic computations , 2007 .

[7]  S. Osher,et al.  One-sided difference approximations for nonlinear conservation laws , 1981 .

[8]  S. K. Godunov,et al.  THE PROBLEM OF A GENERALIZED SOLUTION IN THE THEORY OF QUASILINEAR EQUATIONS AND IN GAS DYNAMICS , 1962 .

[9]  P. Roe Approximate Riemann Solvers, Parameter Vectors, and Difference Schemes , 1997 .

[10]  E. Toro,et al.  Restoration of the contact surface in the HLL-Riemann solver , 1994 .

[11]  Bernd Einfeld On Godunov-type methods for gas dynamics , 1988 .

[12]  R. Courant,et al.  On the solution of nonlinear hyperbolic differential equations by finite differences , 1952 .

[13]  P. Lax,et al.  On Upstream Differencing and Godunov-Type Schemes for Hyperbolic Conservation Laws , 1983 .

[14]  E. Toro Riemann Solvers and Numerical Methods for Fluid Dynamics , 1997 .

[15]  I. Bohachevsky,et al.  Finite difference method for numerical computation of discontinuous solutions of the equations of fluid dynamics , 1959 .