On moduli spaces of uniformly negatively curved metrics

Abstract

Let (X) denote the space of complete Riemannian metrics with uniformly negative curvature on a surface X, equipped with the intrinsic uniform C2 topology. Let M(X)=(X)/(X) be the corresponding moduli space, with the quotient topology. We construct elementary locally constant functionals on M(X), with values in finite symmetric products of \0,1\, based on geodesic string counts. As an upshot we show that M(R× S1) is disconnected. This is perhaps surprising: the two metrics we separate are joined by an explicit path of metrics with constant curvature -1. The point is that this path is only continuous in the weak Whitney topology. More generally, if X is a finite-type surface of hyperbolic type with n punctures, then the pure moduli space has at least 2n connected components, while M(X) has at least n+1 connected components.