Monodromy of the p-rank strata of the moduli space of curves
Abstract
We compute the Z/ and -adic monodromy of every irreducible component of the moduli space Mgf of curves of genus and and p-rank f. In particular, we prove that the Z/-monodromy of every component of Mgf is the symplectic group Sp2g(Z/) if g>=3 and is a prime distinct from p. We give applications to the generic behavior of automorphism groups, Jacobians, class groups, and zeta functions of curves of given genus and p-rank.
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