Some results on translating solitons of the mean curvature flow

Abstract

In this article we prove two non-existence results for translating solitons of the mean curvature flow (translators for short) in Rm+1. We also obtain an upper bound to the maximum height that a compact embedded translator in R3 can achieve. On the other hand, we study graphical perturbations of translators, showing that asymptotic graphical perturbations of a graph translator of revolution remain a hypersurface of revolution. Finally, we prove that compact translators that lie between two parallel planes inherit the symmetries of their boundaries curves.