The Geometry on Smooth Toroidal Compactifications of Siegel varieties

Abstract

This is a part of our joint program. The purpose of this paper is to study smooth toroidal compactifications of Siegel varieties and their applications, we also try to understand the K\"ahler-Einstein metrics on Siegel varieties through the compactifications. Let Ag,:=Hg/ be a Siegel variety, where Hg is the genus-g Siegel space and is an arithmetic subgroup in Aut(Hg). There are four aspects of this paper : 1.There is a correspondence between the category of degenerations of Abelian varieties and the category of limits of weight one Hodge structures. We show that any cusp of Siegel space Hg can be identified with the set of certain weight one polarized mixed Hodge structures. 2.In general, the boundary of a smooth toroidal compactification Ag, of Ag, has self-intersections.For most geometric applications, we would like to have a nice toroidal compactification such that the added infinity boundary D∞ =Ag,-Ag, is a normal crossing divisor, We actually obtain a sufficient and necessary combinatorial condition for toroidal compactifications. 3. A toroidal compactification Ag, of is totally determined by a combinatorial condition : an admissible family of polyhedral decompositions of certain positive cones. We show that the unique K\"ahler-Einstein metric on Ag, endows some restraint combinatorial conditions for all toroidal smooth compactifications of Ag,. 4.We study the asymptotic behaviour of logarithmical canonical line bundles on smooth toroidal compactifications of Ag, and get an integral formula for intersection numbers.