Bergman projection induced by radial weight

Abstract

The question of when the Bergman projection Pω induced by a radial weight ω on the unit disc is a bounded operator from one space into another is of primordial importance in the theory of Bergman spaces. The long-standing problem of describing the radial weights ω such that Pω is bounded on the Lebesgue space Lpω had been known to experts since decades before it was formally posed by Dostani\'c in 2004. A natural limit case of this setting is when Pω acts from L∞ to the Bloch space. The surjectivity of the operator becomes another relevant question in this limit case. The main findings of this study are shortly listed as follows. We establish characterizations of the radial weights ω on the unit disc such that Pω:L∞ is bounded and/or acts surjectively, or the dual of A1ω is isomorphic to the Bloch space B under the A2ω-pairing. We also solve the problem posed by Dostani\'c under a weak regularity hypothesis on the weight involved. With regard to Littlewood-Paley estimates, we describe the radial weights ω such that the norm of any function in Apω is comparable to the norm in Lpω of its derivative times the distance from the boundary. This last-mentioned result solves another well-known problem on the area. All characterizations can be given in terms of doubling conditions on moments and/or tail integrals ∫r1ω(t)\,dt of ω, and are therefore easy to interpret. We also make substantial progress about the two weight inequality \|Pω(f)\|Lp C\|f\|Lp, f∈ Lp, 1<p<∞. for radial weights ω and .