Translating solutions to the Gauss curvature flow with flat sides

Abstract

We derive local C2 estimates for complete non-compact translating solitons of the Gauss curvature flow in R3 which are graphs over a convex domain . This is closely is related to deriving local C1,1 estimates for the degenerate Monge-Amp\'ere equation. As a result, given a weakly convex bounded domain , we establish the existence of a C1,1loc translating soliton. In particular, when the boundary ∂ has a line segment, we show the existence of flat sides of the translator from a local a'priori non-degeneracy estimate near the free-boundary.