Estimates of Bergman Kernels and Bergman metric on compact Picard surfaces
Abstract
Let ⊂ SU((2,1),C) be a torsion-free cocompact subgroup. Let B2 denote the 2-dimensional complex ball endowed with the hyperbolic metric μhyp, and let X:= B2 denote the quotient space, which is a compact complex manifold of dimension 2. Let := X2 denote the line bundle on X, whose sections are holomorphic (2,0)-forms. For any k≥ 1, the hyperbolic metric induces a point-wise metric on H0(X, k ), which we denote by |·|hyp. For any k≥ 1, let B k denote the Bergman kernel of the complex vector space H0(X, k ). For any k≥ 3, and z,w∈ X, the first main result of the article is an off-diagonal estimate of the Bergman kernel B k. For any k≥ 1, let μberk(z):=-i2π∂z∂z| B k(z,z)|hyp denote the Bergman metric associated the line bundle k, and let μberk,vol(z) denote the associated volume form. For k 1 sufficiently large, and ε>0, the second main result of the article is the following estimate align* z∈ X|μberk,vol(z)μhypvol|=OX,ε(k4+ε), align* where μhypvol denotes the volume form associated to the hyperbolic metric μhyp, and the implied constant depends on the Picard surface X, and on the choice of ε>0. abstract
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