Sharp Entropy Bounds for Plane Curves and Dynamics of the Curve Shortening Flow

Abstract

We prove that a closed immersed plane curve with total curvature 2π m has entropy at least m times the entropy of the embedded circle, as long as it generates a type I singularity under the curve shortening flow (CSF). We construct closed immersed plane curves of total curvature 2π m whose entropy is less than m times the entropy of the embedded circle. As an application, we extend Colding-Minicozzi's notion of a generic mean curvature flow to closed immersed plane curves by constructing a piecewise CSF whose only singularities are embedded circles and type II singularities.