Singularities of the Bergman kernel for certain weakly pseudoconvex domains

Abstract

Consider the Bergman kernel KB(z) of the domain = \z ∈ n ; Σj=1n |zj|2mj<1 \, where m=(m1,…,mn) ∈ n and mn ≠ 1. Let z0 ∈ ∂ be any weakly pseudoconvex point, k ∈ the degenerate rank of the Levi form at z0. An explicit formula for KB(z) modulo analytic functions is given in terms of the polar coordinates (t1, …, tk, r) around z0. This formula provides detailed information about the singularities of KB(z), which improves the result of A. Bonami and N. Lohou\'e bol. A similar result is established also for the Szeg\"o kernel KS(z) of .

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