Real Variable Things in Bergman Theory (2412.13854v1)

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 $L^2$ Hartogs-type extension theorem and an $L^p$ integrability theorem for the Bergman kernel $K_\Omega(\cdot,w)$. 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 $\kappa(\Omega)$ of the Bergman kernel $K_\Omega(z)$ in terms of the interior capacity radius for planar domains and the volume density for bounded pseudoconvex domains in $\mathbb C^n$. As a consequence, we show that $\kappa(\Omega)\ge c_0 \lambda_1(\Omega)$ holds on planar domains, where $c_0$ is a numerical constant and $\lambda_1(\Omega)$ is the first Dirichlet eigenvalue of $-\Delta$.