On solid cores and hulls of weighted Bergman spaces Aμ1

Abstract

We consider weighted Bergman spaces Aμ1 on the unit disc as well as the corresponding spaces of entire functions, defined using non-atomic Borel measures with radial symmetry. By extending the techniques from the case of reflexive Bergman spaces we characterize the solid core of Aμ1. Also, as a consequence of a characterization of solid Aμ1-spaces we show that, in the case of entire functions, there indeed exist solid Aμ1-spaces. The second part of the paper is restricted to the case of the unit disc and it contains a characterization of the solid hull of Aμ1, when μ equals the weighted Lebesgue measure with weight v. The results are based on a duality relation of weighted A1- and H∞-spaces, the validity of which requires the assumption that - v belongs to the class W0, studied in a number of publications; moreover, v has to satisfy condition (b), introduced by the authors. The exponentially decreasing weight v(z) = ( -1 /(1-|z|) provides an example satisfying both assumptions.