The curve shortening flow with parallel 1-form

Abstract

Let M be a closed Riemannian manifold with a parallel 1-form . We prove two theorems about the curve shortening flow in M. One is that the in M exists for all t in [0, ∞), if it satisfies (T)≥ 0 on the initial curve . Here T is the unit tangent vector on . The other one is about the convergence. It says that in a closed M, assume the curve shortening flow exists for all t∈[0,∞) and its length converges to a positive limit, then t→∞max|∇mA|2=0 for all m=0,1,.... Here A denotes the second fundamental form of in M.