Endpoint Estimates for Bergman Commutators and New Characterizations of the Bloch Space and H∞

Abstract

We prove an -type distributional inequality for the commutator of the Bergman projection with a conjugate Bloch symbol function on the unit ball. Such an inequality can be seen as a Bergman version of a result due to C. P\'erez for real-variable Calder\'on-Zygmund operators and BMO functions. We also prove that this inequality characterizes membership of analytic functions in the Bloch space and is further equivalent to a kind of modified restricted weak-type estimate, where one only tests over characteristic functions of sets comparable to Bergman balls. We also show our estimate is sharp in the sense that there exists a Bloch function b so that the commutator [b,P] is not weak-type (1,1), and prove [b,P] with b analytic is weak-type (1,1) if and only if b ∈ H∞.