α-Gauss Curvature flows with flat sides

Abstract

In this paper, we study the deformation of the 2 dimensional convex surfaces in 3 whose speed at a point on the surface is proportional to α-power of positive part of Gauss Curvature. First, for 1/2<α≤ 1, we show that there is smooth solution if the initial data is smooth and strictly convex and that there is a viscosity solution with C1,1-estimate before the collapsing time if the initial surface is only convex. Moreover, we show that there is a waiting time effect which means the flat spot of the convex surface will persist for a while. We also show the interface between the flat side and the strictly convex side of the surface remains smooth on 0 < t < T0 under certain necessary regularity and non-degeneracy initial conditions, where T0$ is the vanishing time of the flat side.