Holomorphic Curves in Moduli Spaces Are Quasi-Isometrically Immersed

Abstract

A holomorphic curve in moduli spaces is the image of a non-constant holomorphic map from a hyperbolic surface B of type (g,n) to the moduli space Mh of closed Riemann surfaces of genus h. We show that, when all peripheral monodromies are of infinite order, the holomorphic map is a quasi-isometric immersion with parameters depending only on g, n, h and the systole of B. When peripheral monodromies also satisfy an additional condition, we find a lift quasi-isometrically embedding a fundamental polygon of the hyperbolic surface B into the Teichm\"uller space. We further improve the Parshin-Arakelov finiteness theorem, by proving that there are only finitely many monodromy homomorphisms induced by holomorphic curves of type (g,n) in Mh where systole is bounded away from 0, up to equivalence.