Weighted Bergman spaces and the ∂-equation

Abstract

We give a H\"ormander type L2-estimate for the ∂-equation with respect to the measure δ-αdV, α<1, on any bounded pseudoconvex domain with C2-boundary. Several applications to the function theory of weighed Bergman spaces A2α() are given, including a corona type theorem, a Gleason type theorem, together with a density theorem. We investigate in particular the boundary behavior of functions in A2α() by proving an analogue of the Levi problem for A2α() and giving an optimal Gehring type estimate for functions in A2α(). A vanishing theorem for A21() is established for arbitrary bounded domains. Relations between the weighted Bergman kernel and the Szeg\"o kernel are also discussed.