Minimal Siegel modular threefolds
Abstract
In this paper we study the maximal extension of the subgroup of which is conjugate to the paramodular group. The index of this extension is where is the number of prime divisors of . The group defines the minimal modular threefold which is a finite quotient of the moduli space of -polarized abelian surfaces. A certain degree 2 quotient of is a moduli space of lattice polarized surfaces. The space can be interpreted as the space of Kummer surfaces associated to -polarized abelian surfaces. Using the action of on the space of Jacobi forms we show that many spaces between and posess a non-trivial 3-form, i.e. the Kodaira dimension of these spaces is non-negative. Finally we determine the divisorial part of the ramification locus of the finite map which is a union of Humbert surfaces. We interprete the corresponding Humbert surfaces as Hilbert modular surfaces.
Cite
@article{arxiv.alg-geom/9506017,
title = {Minimal Siegel modular threefolds},
author = {Valeri Gritsenko and Klaus Hulek},
journal= {arXiv preprint arXiv:alg-geom/9506017},
year = {2008}
}
Comments
We have included a theorem explaining the connection of the minimal Siegel modular threefold with the space of Kummer surfaces of abelian surfaces with non-principal polarization. AMSTeX