Entire downward translating solitons to the mean curvature flow in Minkowski space

Abstract

In this paper, we study entire translating solutions u(x) to a mean curvature flow equation in Minkowski space. We show that if =\(x, u(x))| x∈Rn\ is a strictly spacelike hypersurface, then reduces to a strictly convex rank k soliton in Rk, 1 (after splitting off trivial factors) whose "blowdown" converges to a multiple λ∈(0, 1) of a positively homogeneous degree one convex function in Rk. We also show that there is nonuniqueness as the rotationally symmetric solution may be perturbed to a solution by an arbitrary smooth order one perturbation.