Two weight inequality for Bergman projection
Abstract
The motivation of this paper comes from the two weight inequality \|Pω(f)\|Lpv C\|f\|Lpv, f∈ Lpv, for the Bergman projection Pω in the unit disc. We show that the boundedness of Pω on Lpv is characterized in terms of self-improving Muckenhoupt and Bekoll\'e-Bonami type conditions when the radial weights v and ω admit certain smoothness. En route to the proof we describe the asymptotic behavior of the Lp-means and the Lpv-integrability of the reproducing kernels of the weighted Bergman space A2ω.
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