Off-diagonal estimates of the Bergman kernel associated to Siegel varieties

Abstract

For g≥ 2, let ⊂Sp(2g,R) be a discrete subgroup, which is either a cocompact subgroup or an arithmetic subgroup without torsion elements, and let Hg denote the Siegel upper half space of genus g. Let X:=g denote the quotient space, which is a complex manifold of dimension g(g+1)/2. Let X denote the cotangent bundle, and let :=det(X) denote the determinant line bundle of X. For any Z,W∈ X, let dS(Z,W) denote the geodesic distance between the points Z and W on X. 0.15cm For any k≥ 1, let H0(X, k) denote the complex vector space of global sections of the line bundle k, and let \|·\|k denote the point-wise norm on k. Let BX^ k denote the Bergman kernel associated to H0L2(X, k)⊂ H0(X, k), vector subspace of L2 global sections. For any k 1, and Z,W∈ X , we derive estimates of the Bergman kernel \|BX^ k(Z,W)\|k, when is a cocompact subgroup and when is an arithmetic subgroup.