Cohomogeneity-One Lagrangian Mean Curvature Flow

Abstract

We study mean curvature flow of Lagrangians in Cn that are cohomogeneity-one with respect to a compact Lie group G ≤ SU(n) acting linearly on Cn. Each such Lagrangian necessarily lies in a level set μ-1() of the standard moment map μ Cn g*, and mean curvature flow preserves this containment. We classify all cohomogeneity-one self-similarly shrinking, expanding and translating solutions to the flow, as well as cohomogeneity-one smooth special Lagrangians lying in μ-1(0). Restricting to the case of almost-calibrated flows in the zero level set μ-1(0), we classify finite-time singularities, explicitly describing the Type I and Type II blowup models. Finally, given any cohomogeneity-one special Lagrangian in μ-1(0), we show it occurs as the Type II blowup model of a Lagrangian MCF singularity. Throughout, we give explicit examples of suitable group actions, including a complete list in the case of G simple. This yields infinitely many new examples of shrinking and expanding solitons for Lagrangian MCF, as well as infinitely many new singularity models.