On a Curvature Flow in a Band Domain with Unbounded Boundary Slopes

Abstract

We consider an anisotropic curvature flow V= A(n)H + B(n) in a band domain :=[-1,1]× R, where n, V and H denote the unit normal vector, normal velocity and curvature, respectively, of a graphic curve t. We consider the case when A>0>B and the curve t contacts ∂ with slopes equaling to 1 times of its height (which are unbounded when the solution moves to infinity). First, we present the global well-posedness and then, under some symmetric assumptions on A and B, we show the uniform interior gradient estimates for the solution. Based on these estimates, we prove that t converges as t ∞ in C2,1loc ((-1,1)× R) topology to a cup-like traveling wave with infinite derivatives on the boundaries.