Constructing monotone homotopies and sweepouts

Abstract

This article investigates when homotopies can be converted to monotone homotopies without increasing the lengths of curves. A monotone homotopy is one which consists of curves which are simple or constant, and in which curves are pairwise disjoint. We show that, if the boundary of a Riemannian disc can be contracted through curves of length less than L, then it can also be contracted monotonously through curves of length less than L. This proves a conjecture of Chambers and Rotman. Additionally, any sweepout of a Riemannian 2-sphere through curves of length less than L can be replaced with a monotone sweepout through curves of length less than L. Applications of these results are also discussed.