The non-existence of stable Schottky forms

Abstract

Let AgS be the Satake compactification of the moduli space Ag of principally polarized abelian g-folds and MgS the closure of the image of the moduli space Mg of genus g curves in Ag under the Jacobian morphism. Then AgS lies in the boundary of Ag+mS for any m. We prove that Mg+mS and AgS do not meet transversely in Ag+mS, but rather that their intersection contains the mth order infinitesimal neighbourhood of MgS in AgS. We deduce that there is no non-trivial stable Siegel modular form that vanishes on Mg for every g. In particular, given two inequivalent positive even unimodular quadratic forms P and Q, there is a curve whose period matrix distinguishes between the theta series of P and Q.