Coarse density of subsets of Mg

Abstract

Let Mg be the moduli space of genus g Riemann surfaces. We show that an algebraic subvariety of Mg is coarsely dense with respect to the Teichm\"uller metric (or Thurston metric) if and only if it is all of Mg. We apply this to projections of GL2(R)-orbit closures in the space of abelian differentials. Moreover, we determine which strata of abelian differentials have coarsely dense projection to Mg.