Lp regularity of weighted Bergman projection on Fock-Bargmann-Hartogs domain

Abstract

The Fock-Bargmann-Hartogs domain Dn, m(μ) is defined by Dn, m(μ):=\(z, w)∈Cn×Cm: w 2<e-μ z 2\, where μ>0. The Fock-Bargmann-Hartogs domain Dn, m(μ) is an unbounded strongly pseudoconvex domain with smooth real-analytic boundary. In this paper, we first compute the weighted Bergman kernel of Dn, m(μ) with respect to the weight (-)α, where (z,w):=\|w\|2-e-μ \|z\|2 is a defining function for Dn, m(μ) and α>-1. Then, for p∈ [1,∞), we show that the corresponding weighted Bergman projection PDn, m(μ), (-)α is unbounded on Lp(Dn, m(μ), (-)α), except for the trivial case p=2. In particular, this paper gives an example of an unbounded strongly pseudoconvex domain whose ordinary Bergman projection is Lp irregular when p∈ [1,∞)\2\. This result turns out to be completely different from the well-known positive Lp regularity result on bounded strongly pseudoconvex domain.