On positive scalar curvature and moduli of curves

Abstract

In this article we first show that any finite cover of the moduli space of closed Riemann surfaces of genus g with g≥ 2 does not admit any Riemannian metric ds2 of nonnegative scalar curvature such that ds2 dsT2 where dsT2 is the Teichm\"uller metric. Our second result is the proof that any cover M of the moduli space Mg of a closed Riemann surface Sg does not admit any complete Riemannian metric of uniformly positive scalar curvature in the quasi-isometry class of the Teichm\"uller metric, which implies a conjecture of Farb-Weinberger.