Phase transitions and generalized motion by mean curvature

The problem of simulating the motion of evolving surfaces with junctions according to some curvature-dependent speed arises in a number of applications. By alternately diffusing and sharpening characteristic functions for each region, a variety of motions have been obtained which allow for topologic

What happens to the medial axis of a curve that evolves through MCM (mean curvature motion)? We explore some theoretical results regarding properties of both medial axes and curvature motions. Specifically, we present a set of conditions on the local validity of a medial axis transform and a differe

## Abstract The level‐set formulation of motion by mean curvature is a degenerate parabolic equation. We show that its solution can be interpreted as the value function of a deterministic two‐person game. More precisely, we give a family of discrete‐time, two‐person games whose value functions conv

This paper is concerned with the motion of a time-dependent hypersurface \* (t) in R d that evolves with a normal velocity where j is the mean curvature of \*X(t), and g is an external forcing term. Phase field approximation of this motion leads to the Allen-Cahn equation where is an approximation