On the geometry of the asymptotic boundary of translators in H2× R

Abstract

In this work, we study complete properly immersed translators in the product space H2× R, focusing on their asymptotic behavior at infinity. We classify the asymptotic boundary components of these translators under suitable continuity assumptions. Specifically, we prove that if a boundary component lies in the vertical asymptotic boundary, it is of the form \p\× [T,∞) or \p\× R, while if it lies in the horizontal asymptotic boundary, it is a complete geodesic. Our approach is inspired by earlier work on minimal and constant mean curvature surfaces in H2× R, with a key ingredient being the use of symmetric translators as barriers.