Convergence of Curve Shortening Flow to Translating Soliton

Abstract

This paper concerns with the asymptotic behavior of complete non-compact convex curves embedded in R2 under the α-curve shortening flow for exponents α >12. We show that any such curve having in addition its two ends asymptotic to two parallel lines, converges under α-curve shortening flow to the unique translating soliton whose ends are asymptotic to the same parallel lines. This is a new result even in the standard case α=1, and we prove for all exponents up to the critical case α>12.