On R-trees, homotopies, and covering maps

Abstract

A map p:E X has the unique path lifting property if every path in X, after a choice of an initial point, lifts uniquely to a path in E. We prove that if a group G acts on an R-tree T such that the quotient map p: T T/G has the unique path lifting property, then the quotient space T/G does not contain a disc. As a consequence, we show that every map of manifolds with the unique path lifting property is a covering map. The proof requires a study of one-dimensional backtracking in paths. We show the surprising and counterintuitive result that the equivalence relation given by homotopies of paths rel. endpoints is generated by inserting and deleting one-dimensional backtracking.