Bergman spaces under maps of monomial type

Abstract

For appropriate domains 1, 2 we consider mappings A:12 of monomial type. We obtain an orthogonal decomposition of the Bergman space A2(1) into finitely many closed subspaces indexed by characters of a finite Abelian group associated to the mapping A. We then show that each subspace is isomorphic to a weighted Bergman space on 2. This leads to a formula for the Bergman kernel on 1 as a sum of weighted Bergman kernels on 2