English

Minimal Siegel modular threefolds

alg-geom 2008-02-03 v2 Algebraic Geometry

Abstract

In this paper we study the maximal extension Γt\Gamma_t^* of the subgroup Γt\Gamma_t of Sp4(\bq)\operatorname{Sp}_4 (\bq) which is conjugate to the paramodular group. The index of this extension is 2ν(t)2^{\nu(t)} where ν(t)\nu(t) is the number of prime divisors of tt. The group Γt\Gamma_t^* defines the minimal modular threefold \CalAt{\Cal A}_t^* which is a finite quotient of the moduli space \CalAt{\Cal A}_t of (1,t)(1,t)-polarized abelian surfaces. A certain degree 2 quotient of \CalAt{\Cal A}_t is a moduli space of lattice polarized K3K3 surfaces. The space \CalAt{\Cal A}_t^* can be interpreted as the space of Kummer surfaces associated to (1,t)(1,t)-polarized abelian surfaces. Using the action of Γt\Gamma_t^* on the space of Jacobi forms we show that many spaces between \CalAt{\Cal A}_t and \CalAt{\Cal A}_t^* 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 \CalAt\CalAt{\Cal A}_t\rightarrow {\Cal A}_t^* which is a union of Humbert surfaces. We interprete the corresponding Humbert surfaces as Hilbert modular surfaces.

Keywords

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