Solitons to Mean Curvature Flow in the hyperbolic 3-space

Abstract

We consider translators (i.e., initial condition of translating solitons) to mean curvature flow (MCF) in the hyperbolic 3-space H3, providing existence and classification results. More specifically, we show the existence and uniqueness of two distinct one-parameter families of complete rotational translators in H3, one containing catenoid-type translators, and the other parabolic cylindrical ones. We establish a tangency principle for translators in H3 and apply it to prove that properly immersed translators to MCF in H3 are not cylindrically bounded. As a further application of the tangency principle, we prove that any horoconvex translator which is complete or transversal to the x3-axis is necessarily an open set of a horizontal horosphere. In addition, we classify all translators in H3 which have constant mean curvature. We also consider rotators (i.e., initial condition of rotating solitons) to MCF in H3 and, after classifying the rotators of constant mean curvature, we show that there exists a one-parameter family of complete rotators which are all helicoidal, bringing to the hyperbolic context a distinguished result by Halldorsson, set in R3.