Weighted norm inequalities in the variableLlebesgue spaces for the Bergman projector on the unit ball of cn

Abstract

In this work, we extend the theory of B\'ekoll\`e-Bonami Bp weights. Here we replace the constant p by a non-negative measurable function p(·), which is log-H\"older continuous function with lower bound 1. We show that the Bergman projector on the unit ball of Cn is continuous on the weighted variable Lebesgue spaces Lp(·)(w) if and only if w belongs to the generalised B\'ekoll\`e-Bonami class Bp(·). To achieve this, we define a maximal function and show that it is bounded on Lp(·)(w) if w∈ Bp(·). We next state and prove a weighted extrapolation theorem that allows us to conclude.