A Mean Curvature Flow with Prescribed Contact Angles in a High Dimensional Cylinder

Abstract

In this paper we consider a mean curvature flow V=H+A in a high dimensional cylinder × , where, A is a constant, is a bounded domain in n, and, for a hypersurface y=u(x,t) over , V and H denote its normal velocity and mean curvature, respectively. Assume the hypersurface contacts the cylinder boundary ∂ × with prescribed angle θ(x). Under certain assumptions such as is strictly convex and \|θ\|C2 is small, or is not necessarily convex but |A| is sufficiently large, we derive some uniform-in-time gradient bounds for the solutions to initial boundary value problems. Then, we present a trichotomy result as well as its criterion for the asymptotic behavior of the solutions, that is, when I:= A||+∫∂ θ(x) dσ>0 (resp. =0, <0), the solution u converges as t ∞ to a translating solution with positive speed (resp. stationary solution, a translating solution with negative speed).