In this paper we study the level set formulations of certain geometric evolution equations from a numerical point of view. Specifically, we consider the flow by powers greater than one of the mean curvature and the inverse mean curvature flow. Since the corresponding equations in level set form are quasilinear, degenerate and especially possibly singular a regularization method is used in the literature to approximate these equations to overcome the singularities of the equations. Motivated by the paper [29] which studies the finite element approximation of inverse mean curvature flow we prove error estimates for the finite element approximation of the regularized equations for the flow by powers of the mean curvature. We validate the rates...
Level set solutions are an important class of weak solutions to the mean curvature flow which allow ...
A numerical treatment of non-linear higher-order geometric evolution equations with the level set an...
Many practical applications imply the solution of free boundary value problems. If the free boundary...
In this paper we study the level set formulations of certain geometric evolution equations from a nu...
We analyse a finite difference scheme for the approximation of level set solutions to mean curvature...
Abstract. This paper develops and analyzes a finite element method for a nonlinear singular elliptic...
International audienceWe propose a new finite volume numerical scheme for the approximation of regul...
Abstract. We show stability and consistency of the linear semi-implicit complementary volume numeric...
Abstract: "We propose a finite element algorithm for computing the motion of a surface moving by mea...
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 develop a level set theory for the mean curvature evolution of surfaces with arbitrary...
A proof of convergence is given for semi- and full discretizations of mean curvature flow of closed ...
In this article we apply the technique proposed in Deng-Hou-Yu [7] to study the level set dynamics o...
The aim of this paper is to develop a functional-analytic framework for the construction of level se...
Level set solutions are an important class of weak solutions to the mean curvature flow which allow ...
A numerical treatment of non-linear higher-order geometric evolution equations with the level set an...
Many practical applications imply the solution of free boundary value problems. If the free boundary...
In this paper we study the level set formulations of certain geometric evolution equations from a nu...
We analyse a finite difference scheme for the approximation of level set solutions to mean curvature...
Abstract. This paper develops and analyzes a finite element method for a nonlinear singular elliptic...
International audienceWe propose a new finite volume numerical scheme for the approximation of regul...
Abstract. We show stability and consistency of the linear semi-implicit complementary volume numeric...
Abstract: "We propose a finite element algorithm for computing the motion of a surface moving by mea...
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 develop a level set theory for the mean curvature evolution of surfaces with arbitrary...
A proof of convergence is given for semi- and full discretizations of mean curvature flow of closed ...
In this article we apply the technique proposed in Deng-Hou-Yu [7] to study the level set dynamics o...
The aim of this paper is to develop a functional-analytic framework for the construction of level se...
Level set solutions are an important class of weak solutions to the mean curvature flow which allow ...
A numerical treatment of non-linear higher-order geometric evolution equations with the level set an...
Many practical applications imply the solution of free boundary value problems. If the free boundary...