Translating solitons of the mean curvature flow asymptotic to hyperplanes in Rn+1

Abstract

A translating soliton is a hypersurface M in Rn+1 such that the family Mt= M- t \,en+1 is a mean curvature flow, i.e., such that normal component of the velocity at each point is equal to the mean curvature at that point H=en+1. In this paper we obtain a characterization of hyperplanes which are parallel to en+1 and the family of tilted grim reaper cylinders as the only translating solitons in Rn+1 which are C1-asymptotic to two half-hyperplanes outside a non-vertical cylinder. This result was proven for translators in R3 by the second author, Perez-Garcia, Savas-Halilaj and Smoczyk under the additional hypotheses that the genus of the surface was locally bounded and the cylinder was perpendicular to the translating velocity.