Neck pinches along the Lagrangian mean curvature flow of surfaces
Abstract
Let Lt be a zero Maslov, rational Lagrangian mean curvature flow in a compact Calabi-Yau surface, and suppose that at the first singular time a tangent flow is given by the static union of two transverse planes. We show that in this case the tangent flow is unique, and that the flow can be continued past the singularity as an immersed, smooth, zero Maslov, rational Lagrangian mean curvature flow. Furthermore, if L0 is a sphere that is stable in the sense of Thomas-Yau, then such a singularity cannot form.
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