Lp estimates for the Bergman projection on some Reinhardt domains

Abstract

We obtain Lp regularity for the Bergman projection on some Reinhardt domains. We start with a bounded initial domain with some symmetry properties and generate successor domains in higher dimensions. We prove: If the Bergman kernel on satisfies appropriate estimates, then the Bergman projection on the successor is Lp bounded. For example, the Bergman projection on successors of strictly pseudoconvex initial domains is bounded on Lp for 1<p<∞. The successor domains need not have smooth boundary nor be strictly pseudoconvex.