English

Real Variable Things in Bergman Theory

Complex Variables 2024-12-19 v1

Abstract

In this article, we investigate the connection between certain real variable things and the Bergman theory. We first use Hardy-type inequalities to give an L2L^2 Hartogs-type extension theorem and an LpL^p integrability theorem for the Bergman kernel KΩ(,w)K_\Omega(\cdot,w). We then use the Sobolev-Morrey inequality to show the absolute continuity of Bergman kernels on planar domains with respect to logarithmic capacities. Finally, we give lower bounds of the minimum κ(Ω)\kappa(\Omega) of the Bergman kernel KΩ(z)K_\Omega(z) in terms of the interior capacity radius for planar domains and the volume density for bounded pseudoconvex domains in Cn\mathbb C^n. As a consequence, we show that κ(Ω)c0λ1(Ω)\kappa(\Omega)\ge c_0 \lambda_1(\Omega) holds on planar domains, where c0c_0 is a numerical constant and λ1(Ω)\lambda_1(\Omega) is the first Dirichlet eigenvalue of Δ-\Delta.

Keywords

Cite

@article{arxiv.2412.13854,
  title  = {Real Variable Things in Bergman Theory},
  author = {Bo-Yong Chen and Yuanpu Xiong},
  journal= {arXiv preprint arXiv:2412.13854},
  year   = {2024}
}
R2 v1 2026-06-28T20:40:29.066Z