Weighted Szego Kernels on Planar Domains

Abstract

We study properties of weighted Szego and Garabedian kernels on planar domains. Motivated by the unweighted case as explained in Bell's work, the starting point is a weighted Kerzman-Stein formula that yields boundary smoothness of the weighted Szego kernel. This provides information on the dependence of the weighted Szego kernel as a function of the weight. When the weights are close to the constant function 1 (which corresponds to the unweighted case), it is shown that some properties of the unweighted Szego kernel propagate to the weighted Szego kernel as well. Finally, it is shown that the reduced Bergman kernel and higher order reduced Bergman kernels can be written as a rational combination of three unweighted Szego kernels and their conjugates, thereby extending Bell's list of kernel functions that are made up of simpler building blocks that involve the Szego kernel.