Splitting a contraction of a simple curve traversed m times

Abstract

Suppose that M is a 2-dimensional oriented Riemannian manifold, and let γ be a simple closed curve on M. Let m γ denote the curve formed by tracing γ m times. We prove that if m γ is contractible through curves of length less than L, then γ is contractible through curves of length less than L. In the last section we state several open questions about controlling length and the number of self-intersections in homotopies of curves on Riemannian surfaces.