Inflexibility, Weil-Petersson distance, and volumes of fibered 3-manifolds

Abstract

A recent preprint of S. Kojima and G. McShane [KM] observes a beautiful explicit connection between Teichm\"uller translation distance and hyperbolic volume. It relies on a key estimate which we supply here: using geometric inflexibility of hyperbolic 3-manifolds, we show that for S a closed surface, and ∈ Mod(S) pseudo-Anosov, the double iteration Q(-n(X),n(X)) has convex core volume differing from 2n vol(M) by a uniform additive constant, where M is the hyperbolic mapping torus for . We combine this estimate with work of Schlenker, and a branched covering argument to obtain an explicit lower bound on Weil-Petersson translation distance of a pseudo-Anosov ∈ Mod(S) for general compact S of genus g with n boundary components: we have vol(M) 3 π/2(2g - 2 +n) \, \| \|WP. This gives the first explicit estimates on the Weil-Petersson systoles of moduli space, of the minimal distance between nodal surfaces in the completion of Teichm\"uller space, and explicit lower bounds to the Weil-Petersson diameter of the moduli space via [CP]. In the process, we recover the estimates of [KM] on Teichm\"uller translation distance via a Cauchy-Schwarz estimate (see [Lin]).