The mean curvature flow along the K\"ahler-Ricci flow

Abstract

Let (M,g) be a K\"ahler surface, and an immersed surface in M. The K\"ahler angle of in M is introduced by Chern-Wolfson CW. Let (M,g(t)) evolve along the K\"ahler-Ricci flow, and t in (M,g(t)) evolve along the mean curvature flow. We show that the K\"ahler angle α(t) satisfies the evolution equation: (∂∂ t-)α=|∇ J_t|2α+R2αα, where R is the scalar curvature of (M, g(t)). The equation implies that, if the initial surface is symplectic (Lagrangian), then along the flow, t is always symplectic (Lagrangian) at each time t, which we call a symplectic (Lagrangian) K\"ahler-Ricci mean curvature flow. In this paper, we mainly study the symplectic K\"ahler-Ricci mean curvature flow.