Propagation of a Mean Curvature Flow in a Cone

Abstract

We consider a mean curvature flow in a cone, that is, a hypersurface in a cone which moves toward the opening with normal velocity equaling to the mean curvature, and the contact angle between the hypersurface and the cone boundary being -periodic in its position. First, by constructing a family of self-similar solutions, we give a priori estimates for the radially symmetric solutions and prove the global existence. Then we consider the homogenization limit as 0, and use the slowest self-similar solution to characterize the solution, with error O(1)1/6, in some finite time interval.