We obtain sharp pointwise error estimates for relaxation approximation to scalar conservation laws with piecewise smooth solutions. We first prove that the first-order partial derivatives for the perturbation solutions are uniformly upper bounded (the so-called Lip+ stability). A one-sided interpolation inequality between classical L1 error estimates and Lip+ stability bounds enables us to convert a global L1 result into a (nonoptimal) local estimate. Optimal error bounds on the weighted error then follow from the maximum principle for weakly coupled hyperbolic systems. The main difficulties in obtaining the Lip+ stability and the optimal pointwise errors are how to construct appropriate “difference functions” so that the maximum pri...
AbstractWe introduce a relaxation model for front propagation problems. Our proposed relaxation appr...
Recently there have been numerous advances in the development of numerical algorithms to solve conse...
We derive optimal error bounds for the viscosity method and monotone difference schemes to an initia...
In this paper, we prove a global error estimate for a relaxation scheme approximating scalar conserv...
We show the discrete lip"+-stability for a relaxation scheme proposed by Jin and Xin (1995, Com...
In this paper we address the questions of the convergence rate for approximate solutions to conserva...
AbstractWe consider a scalar conservation law with stiff source term in the quarter plan. This equat...
The convergence rate is discussed of approximate solutions for the nonlinear scalar conservation law...
AbstractIn this paper we study the asymptotic equivalence of a general system of 1-D conservation la...
AbstractWe are concerned with singular limits of stiff relaxation and dominant diffusion for general...
We consider approximate solutions to nonlinear hyperbolic conservation laws. If the exact solution i...
[[abstract]]We study the rate of convergence of the viscous and numerical approximate solution to th...
AbstractWe investigate stability of multidimensional planar shock profiles of a general hyperbolic r...
AbstractWe study the structure and smoothness of non-homogeneous convex conservation laws. The quest...
Abstract. We analyze the convergence for relaxation approximation applied to conservation laws with ...
AbstractWe introduce a relaxation model for front propagation problems. Our proposed relaxation appr...
Recently there have been numerous advances in the development of numerical algorithms to solve conse...
We derive optimal error bounds for the viscosity method and monotone difference schemes to an initia...
In this paper, we prove a global error estimate for a relaxation scheme approximating scalar conserv...
We show the discrete lip"+-stability for a relaxation scheme proposed by Jin and Xin (1995, Com...
In this paper we address the questions of the convergence rate for approximate solutions to conserva...
AbstractWe consider a scalar conservation law with stiff source term in the quarter plan. This equat...
The convergence rate is discussed of approximate solutions for the nonlinear scalar conservation law...
AbstractIn this paper we study the asymptotic equivalence of a general system of 1-D conservation la...
AbstractWe are concerned with singular limits of stiff relaxation and dominant diffusion for general...
We consider approximate solutions to nonlinear hyperbolic conservation laws. If the exact solution i...
[[abstract]]We study the rate of convergence of the viscous and numerical approximate solution to th...
AbstractWe investigate stability of multidimensional planar shock profiles of a general hyperbolic r...
AbstractWe study the structure and smoothness of non-homogeneous convex conservation laws. The quest...
Abstract. We analyze the convergence for relaxation approximation applied to conservation laws with ...
AbstractWe introduce a relaxation model for front propagation problems. Our proposed relaxation appr...
Recently there have been numerous advances in the development of numerical algorithms to solve conse...
We derive optimal error bounds for the viscosity method and monotone difference schemes to an initia...