Add to ORKGWe present a variational formulation of fully anisotropic motion by surface diffusion and mean curvature flow, as well as related flows. The proposed scheme covers both the closed curve case, and the case of curves that are connected via triple junction points. On introducing a parametric finite element approximation, we prove stability bounds and report on numerical experiments, including crystalline mean curvature flow and crystalline surface diffusion. The presented scheme has very good properties with respect to the equidistribution of mesh points and, if applicable, area conservation
We give a simple proof of convergence of the anisotropic variant of a well-known algorithm for mean ...
In this paper, we provide simple proofs of consistency for two well-known algorithms for mean curvat...
In this paper, we provide simple proofs of consistency for two well-known algorithms for mean curvat...
We present a variational formulation of fully anisotropic motion by surface diffusion and mean curva...
We present a variational formulation of fully anisotropic motion by surface diffusion and mean curva...
We present a variational formulation of fully anisotropic motion by surface diffusion and mean curva...
A number of numerical simulations of surfaces evolving by mean curvature in anisotropic materials a...
We present variational formulations of mean curvature flow and surface diffusion for axisymmetric h...
We present variational formulations of mean curvature flow and surface diffusion for axisymmetric h...
In this paper we present and discuss the results of some numerical simulations in order to investiga...
Evolution by mean curvature is recently attracting large attention especially when the underlying an...
We present a variational formulation for the evolution of surface clusters in R3 by mean curvature f...
We present a variational formulation for the evolution of surface clusters in R3 by mean curvature f...
We present a variational formulation for the evolution of surface clusters in R3 by mean curvature f...
We give a simple proof of convergence of the anisotropic variant of a well-known algorithm for mean ...
We give a simple proof of convergence of the anisotropic variant of a well-known algorithm for mean ...
In this paper, we provide simple proofs of consistency for two well-known algorithms for mean curvat...
In this paper, we provide simple proofs of consistency for two well-known algorithms for mean curvat...
We present a variational formulation of fully anisotropic motion by surface diffusion and mean curva...
We present a variational formulation of fully anisotropic motion by surface diffusion and mean curva...
We present a variational formulation of fully anisotropic motion by surface diffusion and mean curva...
A number of numerical simulations of surfaces evolving by mean curvature in anisotropic materials a...
We present variational formulations of mean curvature flow and surface diffusion for axisymmetric h...
We present variational formulations of mean curvature flow and surface diffusion for axisymmetric h...
In this paper we present and discuss the results of some numerical simulations in order to investiga...
Evolution by mean curvature is recently attracting large attention especially when the underlying an...
We present a variational formulation for the evolution of surface clusters in R3 by mean curvature f...
We present a variational formulation for the evolution of surface clusters in R3 by mean curvature f...
We present a variational formulation for the evolution of surface clusters in R3 by mean curvature f...
We give a simple proof of convergence of the anisotropic variant of a well-known algorithm for mean ...
We give a simple proof of convergence of the anisotropic variant of a well-known algorithm for mean ...
In this paper, we provide simple proofs of consistency for two well-known algorithms for mean curvat...
In this paper, we provide simple proofs of consistency for two well-known algorithms for mean curvat...