Nonparametric mean curvature type flows of graphs with contact angle conditions

Abstract

In this paper we study nonparametric mean curvature type flows in M×R which are represented as graphs (x,u(x,t)) over a domain in a Riemannian manifold M with prescribed contact angle. The speed of u is the mean curvature speed minus an admissible function (x,u,Du). Long time existence and uniformly convergence are established if (x,u, Du) 0 with vertical contact angle and (x,u,Du)=h(x,u)ω with hu(x,u)≥ h0>0 and ω=1+|Du|2. Their applications include mean curvature type equations with prescribed contact angle boundary condition and the asymptotic behavior of nonparametric mean curvature flows of graphs over a convex domain in M2 which is a surface with nonnegative Ricci curvature.