AbstractWe study the structure and smoothness of non-homogeneous convex conservation laws. The question regarding the number of smoothness pieces is addressed. It is shown that under certain conditions on the initial data the entropy solution has only a finite number of discontinuous curves. We also obtain some global estimates on derivatives of the piecewise smooth entropy solution along the generalized characteristics. These estimates play important roles in obtaining the optimal rate of convergence for various approximation methods to conservation laws
We consider a scalar conservation law with a discontinuous flux function. The fluxes are non-convex,...
International audienceIn this paper, the question of existence and uniqueness for entropy solutions ...
In this paper we address the questions of the convergence rate for approximate solutions to conserva...
We study the structure and smoothness of non-homogeneous convex conservation laws. The question rega...
. We study the structure and smoothness of non-homogeneous convex conservation laws. We address the ...
AbstractWe study the structure and smoothness of non-homogeneous convex conservation laws. The quest...
The behavior and structure of entropy solutions of scalar convex conservation laws are studied. It i...
The behavior and structure of entropy solutions of scalar convex conser-vation laws are studied. It ...
It is proved that for nonhomogeneous scalar conservation laws, if the flux function is strictly conv...
It is proved that for scalar conservation laws, if the flux function is strictly convex, and if the ...
We consider scalar conservation laws in one space dimension with convex flux and we establish a new ...
Goal of this thesis is to study four problems. In chapters 3-5, we consider scalar conser- vation la...
We consider a scalar conservation law with discontinuous flux function. The fluxes are non-convex, h...
We study the regularity of discontinuous entropy solutions to scalar hyperbolic conservation laws wi...
We consider a scalar conservation law with a discontinuous flux function. The fluxes are non-convex,...
We consider a scalar conservation law with a discontinuous flux function. The fluxes are non-convex,...
International audienceIn this paper, the question of existence and uniqueness for entropy solutions ...
In this paper we address the questions of the convergence rate for approximate solutions to conserva...
We study the structure and smoothness of non-homogeneous convex conservation laws. The question rega...
. We study the structure and smoothness of non-homogeneous convex conservation laws. We address the ...
AbstractWe study the structure and smoothness of non-homogeneous convex conservation laws. The quest...
The behavior and structure of entropy solutions of scalar convex conservation laws are studied. It i...
The behavior and structure of entropy solutions of scalar convex conser-vation laws are studied. It ...
It is proved that for nonhomogeneous scalar conservation laws, if the flux function is strictly conv...
It is proved that for scalar conservation laws, if the flux function is strictly convex, and if the ...
We consider scalar conservation laws in one space dimension with convex flux and we establish a new ...
Goal of this thesis is to study four problems. In chapters 3-5, we consider scalar conser- vation la...
We consider a scalar conservation law with discontinuous flux function. The fluxes are non-convex, h...
We study the regularity of discontinuous entropy solutions to scalar hyperbolic conservation laws wi...
We consider a scalar conservation law with a discontinuous flux function. The fluxes are non-convex,...
We consider a scalar conservation law with a discontinuous flux function. The fluxes are non-convex,...
International audienceIn this paper, the question of existence and uniqueness for entropy solutions ...
In this paper we address the questions of the convergence rate for approximate solutions to conserva...