Mean Curvature Flow of Spacelike Graphs

Abstract

We prove the mean curvature flow of a spacelike graph in (1× 2, g1-g2) of a map f:1 2 from a closed Riemannian manifold (1,g1) with Ricci1> 0 to a complete Riemannian manifold (2,g2) with bounded curvature tensor and derivatives, and with sectional curvatures satisfying K2≤ K1, remains a spacelike graph, exists for all time, and converges to a slice at infinity. We also show, with no need of the assumption K2≤ K1, that if K1>0, or if Ricci1>0 and K2≤ -c, c>0 constant, any map f:1 2 is trivially homotopic provided f*g2< g1 where =_1K1/_2K2+≥ 0, in case K1>0, and =+∞ in case K2≤ 0. This largely extends some known results for Ki constant and 2 compact, obtained using the Riemannian structure of 1× 2, and also shows how regularity theory on the mean curvature flow is simpler and more natural in pseudo-Riemannian setting then in the Riemannian one.