L1 Error Estimates for Difference Approximations Of Degenerate Convection-Diffusion Equations
arXiv:1205.0907
Abstract
We analyze monotone difference schemes for strongly degenerate convection-diffusion equations in one spatial dimension. These nonlinear equations are well-posed within a class of (discontinuous) entropy solutions. We prove that the L1 difference between the approximate solutions and the unique entropy solution is bounded above by a constant times the cube root of the spatial discretization parameter.