Graphical mean curvature flow with bounded bi-Ricci curvature

Abstract

We consider the graphical mean curvature flow of strictly area decreasing maps f:M N, where M is a compact Riemannian manifold of dimension m>1 and N a complete Riemannian surface of bounded geometry. We prove long-time existence of the flow and that the strictly area decreasing property is preserved, when the bi-Ricci curvature BRicM of M is bounded from below by the sectional curvature σN of N. In addition, we obtain smooth convergence to a minimal map if RicM\0,NσN\. These results significantly improve known results on the graphical mean curvature flow in codimension 2.