The asymptotic Schottky problem

Abstract

Let Mg denote the moduli space of compact Riemann surfaces of genus g and let Ag be the space of principally polarized abelian varieties of (complex) dimension g. Let J: Mg Ag be the map which associates to a Riemann surface its Jacobian. The map J is injective, and the image J( Mg) is contained in a proper subvariety of Ag when g≥ 4. The classical and long-studied Schottky problem is to characterize the Jacobian locus Jg:=J( Mg) in Ag. In this paper we adress a large scale version of this problem posed by Farb and called the coarse Schottky problem: How does Jg look "from far away", or how "dense" is Jg in the sense of coarse geometry? The coarse geometry of the Siegel modular variety Ag is encoded in its asymptotic cone Cone∞( Ag), which is a Euclidean simplicial cone of (real) dimension g. Our main result asserts that the Jacobian locus Jg is "asymptotically large", or "coarsely dense" in Ag. More precisely, the subset of Cone∞( Ag) determinded by Jg actually coincides with this cone. The proof also shows that the Jacobian locus of hyperelliptic curves is coarsely dense in Ag as well. We also study the boundary points of the Jacobian locus Jg in Ag and in the Baily-Borel and the Borel-Serre compactification. We show that for large genus g the set of boundary points of Jg in these compactifications is "small".