We analyse a finite difference scheme for the approximation of level set solutions to mean curvature flow. The scheme which was proposed by Crandall & Lions (Numer. Math. 75, (1996) 17-41) is a monotone and consistent discretization of a regularized version of the underlying problem. We derive an L[infin]-error bound between the numerical solution and the viscosity solution to the level set equation provided that the space and time step sizes are appropriately related to the regularization parameter
This paper is concerned with the study of a geometric flow whose law involves a singular integral o...
An advantage of using level set methods for moving boundary problems is that geometric quantities su...
Abstract. We study the gradient flow for the total variation functional, which arises in image pro-c...
International audienceWe propose a new finite volume numerical scheme for the approximation of regul...
In this paper we study the level set formulations of certain geometric evolution equations from a nu...
Abstract. We show stability and consistency of the linear semi-implicit complementary volume numeric...
AbstractAn accurate finite difference scheme for the flow by curvature in R2 is presented, and its c...
A difference scheme is introduced for computing the motion of level surfaces moved by the mean curva...
International audienceIn this work, we propose a new numerical scheme for the anisotropic mean curva...
Many practical applications imply the solution of free boundary value problems. If the free boundary...
We introduce a novel algorithm that converges to level-set convex viscosity solutions of high-dimens...
In the research fields of applied sciences like physics, engineering and biology, it is important to...
This article addresses the use of the level-set method for capturing the interface between two fluid...
Abstract: "We develop a level set theory for the mean curvature evolution of surfaces with arbitrary...
We propose a new scheme for the level set approximation of motion by mean curvature (MCM). The schem...
This paper is concerned with the study of a geometric flow whose law involves a singular integral o...
An advantage of using level set methods for moving boundary problems is that geometric quantities su...
Abstract. We study the gradient flow for the total variation functional, which arises in image pro-c...
International audienceWe propose a new finite volume numerical scheme for the approximation of regul...
In this paper we study the level set formulations of certain geometric evolution equations from a nu...
Abstract. We show stability and consistency of the linear semi-implicit complementary volume numeric...
AbstractAn accurate finite difference scheme for the flow by curvature in R2 is presented, and its c...
A difference scheme is introduced for computing the motion of level surfaces moved by the mean curva...
International audienceIn this work, we propose a new numerical scheme for the anisotropic mean curva...
Many practical applications imply the solution of free boundary value problems. If the free boundary...
We introduce a novel algorithm that converges to level-set convex viscosity solutions of high-dimens...
In the research fields of applied sciences like physics, engineering and biology, it is important to...
This article addresses the use of the level-set method for capturing the interface between two fluid...
Abstract: "We develop a level set theory for the mean curvature evolution of surfaces with arbitrary...
We propose a new scheme for the level set approximation of motion by mean curvature (MCM). The schem...
This paper is concerned with the study of a geometric flow whose law involves a singular integral o...
An advantage of using level set methods for moving boundary problems is that geometric quantities su...
Abstract. We study the gradient flow for the total variation functional, which arises in image pro-c...