Iterative methods for solving gasdynamic equations
Abstract
The paper describes iterative methods for solving nonlinear systems of difference equations, written in divergent and nondivergent forms, and approximating the gasdynamic equations for a heatconducting gas. For divergent equations with allowance for physical viscosity, all the methods considered are applicable in the case of plane geometry; for nondivergent equations, some of them can be used after obvious modification in the case of arbitrary onedimensional geometry. The effectiveness of the proposed method is illustrated by the solution of certain model problems.
 Publication:

Zhurnal Vychislitelnoi Matematiki i Matematicheskoi Fiziki
 Pub Date:
 March 1986
 Bibcode:
 1986ZVMMF..26..408Z
 Keywords:

 Computational Fluid Dynamics;
 Conductive Heat Transfer;
 Difference Equations;
 Gas Dynamics;
 Iterative Solution;
 Nonlinear Equations;
 EulerLagrange Equation;
 Gas Viscosity;
 One Dimensional Flow;
 Shock Wave Propagation;
 Two Dimensional Flow;
 Fluid Mechanics and Heat Transfer