Bergman kernels over polarized K\"ahler manifolds, Bergman logarithmic flatness, and a question of Lu-Tian

Abstract

Let M be a complete K\"ahler manifold, and let (L, h) M be a positive line bundle inducing a K\"ahler metric g on M. We study two Bergman kernels in this setting: the Bergman kernel of the disk bundle of the dual line bundle (L*, h*), and the Bergman kernel of the line bundle (Lk, hk), k≥ 1, twisted by the canonical line bundle of (M, g). We first prove a localization result for the former Bergman kernel. Then we establish a necessary and sufficient condition for this Bergman kernel to have no logarithmic singularity, expressed in terms of the Tian-Yau-Zelditch-Catlin type expansion of the latter Bergman kernel. This result, in particular, answers a question posed by Lu and Tian. As an application, we show that if (M, g) is compact and locally homogeneous, then the circle bundle of (L*, h*) is necessarily Bergman logarithmically flat.

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