The convergence rate of Godunov type schemes
暂无分享,去创建一个
[1] S. Osher. Riemann Solvers, the Entropy Condition, and Difference , 1984 .
[2] Eitan Tadmor,et al. Numerical Viscosity and the Entropy Condition for Conservative Difference Schemes , 1984 .
[3] E. Tadmor,et al. Non-oscillatory central differencing for hyperbolic conservation laws , 1990 .
[4] B. V. Leer,et al. Towards the ultimate conservative difference scheme. II. Monotonicity and conservation combined in a second-order scheme , 1974 .
[5] Randall J. LeVeque,et al. A geometric approach to high resolution TVD schemes , 1988 .
[6] E. Tadmor. Local error estimates for discontinuous solutions of nonlinear hyperbolic equations , 1991 .
[7] Ami Harten,et al. Self adjusting grid methods for one-dimensional hyperbolic conservation laws☆ , 1983 .
[8] Yann Brenier,et al. The discrete one-sided Lipschitz condition for convex scalar conservation laws , 1988 .
[9] Eitan Tadmor,et al. The convergence rate of approximate solutions for nonlinear scalar conservation laws. Final Report , 1991 .
[10] S. Osher,et al. On the convergence of difference approximations to scalar conservation laws , 1988 .