The space of compact self-shrinking solutions to the Lagrangian Mean Curvature Flow in C2

Abstract

Let Fn :(, hn) C2 be a sequence of conformally immersed Lagrangian self-shrinkers with a uniform area upper bound to the mean curvature flow, and suppose that the sequence of metrics \hn\ converges smoothly to a Riemannian metric h. We show that a subsequence of \Fn\ converges smoothly to a branched conformally immersed Lagrangian self-shrinker F∞ : (, h) C2. When the area bound is less than 16π, the limit F∞ is an embedded torus. When the genus of is one, we can drop the assumption on convergence hn h. When the genus of is zero, we show that there is no branched immersion of as a Lagrangian shrinker, generalizing the rigidity result of Smoczyk in dimension two by allowing branch points.