Weighted Kernel Functions on Planar Domains
Abstract
We study the variation of weighted Szeg\H{o} and Garabedian kernels on planar domains as a function of the weight. A Ramadanov type theorem is shown to hold as the weights vary. As a consequence, we derive properties of the zeros of the weighted Szeg\H{o} and Garabedian kernel for weights close to the constant function on the boundary. We further study the weighted Ahlfors map and strengthen results concerning its boundary behaviour. Explicit examples of the weighted kernels are presented for certain classes of weights. We highlight an interesting property of the weighted Szeg\H{o} and Garabedian kernels, implicit in Nehari's work, and explore several of its consequences. Finally, we discuss the weighted Carath\'eodory metric, and describe relations of the weighted Szeg\H{o} and Garabedian kernel with certain classical kernel functions.
Cite
@article{arxiv.2508.14016,
title = {Weighted Kernel Functions on Planar Domains},
author = {Aakanksha Jain and Kaushal Verma},
journal= {arXiv preprint arXiv:2508.14016},
year = {2025}
}
Comments
26 pages. Comments are most welcome