Translators to Higher Order Mean Curvature Flows in Rn× R and Hn× R

Abstract

We consider translators to the extrinsic flows in Rn× R and Hn× R (called r-mean curvature flows or r-MCF, for short) whose velocity functions are the higher order mean curvatures Hr. We show that there exist rotational bowl-type and catenoid-type translators to r-MCF in both Rn× R and Hn× R, and also that there exist parabolic and hyperbolic catenoid-type translators to r-MCF in Hn× R. In addition, we show that there exist Grim Reaper-type translators to Gaussian flow (n-MCF) in Rn× R and Hn× R. We also establish the uniqueness of all these translators (together with certain cylinders) among those which are invariant by either rotations or translations (Euclidean, parabolic or hyperbolic). We apply this uniqueness result to classify the translators to r-MCF in Rn× R and Hn× R whose r-th mean curvature is constant, as well as those which are isoparametric. Our results extend to the context of r-MCF in Rn× R and Hn× R the existence and uniqueness theorems by Altschuler--Wu (of the bowl soliton) and Clutterbuck--Schn\"urer--Schulze (of the translating catenoids) in Euclidean space.

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