In this paper, we review some ideas on continuous dependence results for the entropy solution of hyperbolic scalar conservation laws. They lead to a complete L (L1)-approximation theory with which error estimates for numerical methods for this type of equations can be obtained. The approach we consider consists in obtaining continuous dependence results for the solutions of parabolic conservation laws and deducing from them the corresponding results for the entropy solution. This is a natural approach as the entropy solution is nothing but the limit of solutions of parabolic scalar conservation laws as the viscosity coefficient goes to zero
Abstract. This paper studies the boundary layers that generally arise in approximations of the entro...
"There is no theory for the initial value problem for compressible flows in two space dimension...
Despite the classical well-posedness theorem for entropy weak solutions of scalar conservation laws,...
It is proved that for scalar conservation laws, if the flux function is strictly convex, and if the ...
Abstract. We establish the L2-stability of an entropy viscosity technique applied to nonlinear scala...
This paper provides a survey of recent results concerning the stability and convergence of viscous a...
It is proved that for nonhomogeneous scalar conservation laws, if the flux function is strictly conv...
This work deals with the relation between the numerical solutions of hyperbolic systems of conservat...
. We study the spectral viscosity (SV) method in the context of multidimensional scalar conservation...
[[abstract]]We study the rate of convergence of the viscous and numerical approximate solution to th...
Relying on recent advances in the theory of entropy solutions for nonlinear (strongly) degenerate pa...
We derive optimal error bounds for the viscosity method and monotone difference schemes to an initia...
We study the spectral viscosity (SV) method in the context of multidimensional scalar conservation l...
We study the parabolic approximation of a multidimensional scalar conservation law with initial and ...
AbstractWe consider one-dimensional scalar conservation laws with and without viscosity where the fl...
Abstract. This paper studies the boundary layers that generally arise in approximations of the entro...
"There is no theory for the initial value problem for compressible flows in two space dimension...
Despite the classical well-posedness theorem for entropy weak solutions of scalar conservation laws,...
It is proved that for scalar conservation laws, if the flux function is strictly convex, and if the ...
Abstract. We establish the L2-stability of an entropy viscosity technique applied to nonlinear scala...
This paper provides a survey of recent results concerning the stability and convergence of viscous a...
It is proved that for nonhomogeneous scalar conservation laws, if the flux function is strictly conv...
This work deals with the relation between the numerical solutions of hyperbolic systems of conservat...
. We study the spectral viscosity (SV) method in the context of multidimensional scalar conservation...
[[abstract]]We study the rate of convergence of the viscous and numerical approximate solution to th...
Relying on recent advances in the theory of entropy solutions for nonlinear (strongly) degenerate pa...
We derive optimal error bounds for the viscosity method and monotone difference schemes to an initia...
We study the spectral viscosity (SV) method in the context of multidimensional scalar conservation l...
We study the parabolic approximation of a multidimensional scalar conservation law with initial and ...
AbstractWe consider one-dimensional scalar conservation laws with and without viscosity where the fl...
Abstract. This paper studies the boundary layers that generally arise in approximations of the entro...
"There is no theory for the initial value problem for compressible flows in two space dimension...
Despite the classical well-posedness theorem for entropy weak solutions of scalar conservation laws,...