Singularities of Curve Shortening Flow with Convex Projections

Abstract

We show that any smooth closed immersed curve in Rn with a one-to-one convex projection onto some 2-plane develops a Type~I singularity and becomes asymptotically circular under Curve Shortening flow in Rn. As an application, we prove an analog of Huisken's conjecture for Curve Shortening flow in Rn, showing that any smooth closed immersed curve in Rn can be smoothly perturbed to a closed immersed curve in Rn+2 which shrinks to a round point under Curve Shortening flow. Our proof relies on a novel contradiction argument in which Type~II singularities are excluded by proving both the uniqueness and non-uniqueness of the tangent flows at the singular point.