Bergman kernel and projection on the unbounded worm domain

Abstract

In this paper we study the Bergman kernel and projection on the unbounded worm domain W∞ = \(z1,z2)∈C2 : |z1-ei|z2|2|2<1, z2≠0\. We first show that the Bergman space of W∞ is infinite dimensional. Then we study Bergman kernel K and Bergman projection P for W∞. We prove that K(z,w) extends holomorphically in z (and antiholomorphically in w) near each point of the boundary except for a specific subset that we study in detail. By means of an appropriate asymptotic expansion for K, we prove that the Bergman projection P:Ws Ws if s>0 and P:Lp Lp if p≠2, where Ws denotes the classic Sobolev space, and Lp the Lebesgue space, respectively, on W∞.