On the volumes of linear subvarieties in moduli spaces of projectivized Abelian differentials

Abstract

For k ∈ Z>0, let H(k)g,n denote the vector bundle over Mg,n whose every fiber consists of meromorphic k-differentials with poles of order at most k-1 on a fixed Riemman surface of genus g with n marked points (all the poles must be located at the marked points). The bundle H(k)g,n and its associated projective bundle PH(k)g,n admit natural extensions, denoted by H(k)g,n and PH(k)g,n respectively, to the Deligne-Mumford compactification Mg,n of Mg,n. We prove the following statement: let M be a subvariety of dimension d of the projective bundle PH(k)g,n. Denote by O(-1)PH(k)g,n the tautological line bundle over PH(k)g,n. Then the integral of the d-th power of the curvature form of the Hodge norm on O(-1)PH(k)g,n over the smooth part of M is equal to the intersection number of the d-th power of the divisor representing O(-1)PH(k)g,n and the closure of M in PH(k)g,n. As a consequence, if M is a linear subvariety of the projectivized Hodge bundle PHg,n(=PH(1)g,n) whose local coordinates do not involve relative periods, then the volume of M can be computed by the self-intersection number of the tautological line bundle on the closure of M in PHg,n(=PH(1)g,n).