This paper is concerned with the numerical approximation of mean curvature flow → () satisfying an additional inclusion-exclusion constraint
⊂ () ⊂
. Classical phase field model to approximate these evolving interfaces consists in solving the Allen-Cahn equation with Dirichlet boundary conditions. In this work, we introduce a new phase field model, which can be viewed as an Allen Cahn equation with a penalized double well potential. We first justify this method...
This paper deals with the use of wavelets in the framework of the Mortar method. We first review in an abstract framework the theory of the mortar method for non conforming domain decomposition, and point out some basic assumptions under which stability and convergence of such method can be proven. We study the application of the mortar method in the biorthogonal wavelet framework. In particular we define suitable multiplier spaces for imposing weak continuity. Unlike in the classical mortar method,...
This paper is concerned with the numerical approximation of mean curvature flow → () satisfying an additional inclusion-exclusion constraint
⊂ () ⊂
. Classical phase field model to approximate these evolving interfaces consists in solving the Allen-Cahn equation with Dirichlet boundary conditions. In this work, we introduce a new phase field model, which can be viewed as an Allen Cahn equation with a penalized double well potential. We first justify this method...
This paper deals with the use of wavelets in the framework of the Mortar method.
We first review in an abstract framework the theory of the mortar method for
non conforming domain decomposition, and point out some basic assumptions
under which stability and convergence of such method can be proven. We study
the application of the mortar method in the biorthogonal wavelet framework.
In particular we define suitable multiplier spaces for imposing weak
continuity. Unlike in the classical mortar method,...
Download Results (CSV)