论文信息 - Subgrid resolution of fluid discontinuities, II

Subgrid resolution of fluid discontinuities, II

Abstract In computation of discontinuities in solutions of hyperbolic equations, the random choice method gives a zero viscosity numerical solution with perfect resolution but first-order position errors ∼±2.5Δx. The Lax-Wendroff scheme gives very small first-order position errors, but resolution errors ∼±2.5Δx. We propose two very simple tracking methods in the context of the random choice method, which combine the best features of both methods: perfect resolution and good accuracy. We compare the above with tracking in the context of the Lax-Wendroff scheme. The latter method is morre complicated, but much more accurate than any of the other methods considered here.

[1] Tai-Ping Liu. The deterministic version of the Glimm scheme , 1977 .

[2] A. Chorin. Flame advection and propagation algorithms , 1980 .

[3] Alexandre J. Chorin,et al. Random choice solution of hyperbolic systems , 1976 .

[4] Gary A. Pope,et al. The Application of Fractional Flow Theory to Enhanced Oil Recovery , 1980 .

[5] J. Glimm. Solutions in the large for nonlinear hyperbolic systems of equations , 1965 .

[6] Lauwerens Kuipers,et al. Uniform distribution of sequences , 1974 .

[7] G. Sod. Automotive Engine Modeling with a Hybrid Random Choice Method, II , 1979 .

[8] R. D. Richtmyer,et al. Difference methods for initial-value problems , 1959 .

[9] Paul Concus,et al. Numerical Solution Of The Multi-Dimensional Buckley-Leveret Equation By A Sampling Method , 2011 .