Bergman projection induced by radial weight acting on growth spaces

Abstract

Let ω be a radial weight on the unit disc of the complex plane D and denote ωx =∫01 sx ω(s)\,ds, x 0, for the moments of ω and ω(r)=∫r1 ω(s)\,ds for the tail integrals. A radial weight ω belongs to the class D if satisfies the upper doubling condition 0<r<1ω(r)ω(1+r2)<∞. If or ω belongs to D, it is described the boundedness of the Bergman projection Pω induced by ω on the growth space L∞ =\ f: \|f\|∞,v= esssupz∈D |f(z)|(z)<∞\ in terms of neat conditions on the moments and/or the tail integrals of ω and . Moreover, it is solved the analogous problem for Pω from L∞ to the Bloch type space B∞ of analytic functions such that z∈ D(1-|z|)(z) |f'(z)|<∞. We also study similar questions for exponentially decreasing radial weights.