α-Mean curvature flow of non-compact complete convex hypersurfaces and the evolution of level sets

Abstract

We consider the α -mean curvature flow for convex graphs in Euclidean space. Given a smooth, complete, strictly convex, non-compact initial hypersurface over a strictly convex projected domain, we derive uniform curvature bounds, which are independent of the height of a graph, to give C 2 {C}^{2} -estimates for convex graphs. Consequently, these height-independent estimates imply that all the derivatives for level sets converge uniformly. Furthermore, with these estimates on level sets, the boundary of the domain of a graph, which demonstrates the behavior of level sets as the height tends to infinity, is shown to be a smooth solution for the α -mean curvature flow of codimension two in the classical sense. © 2025 Elsevier B.V., All rights reserved.