Radial two weight inequality for maximal Bergman projection induced by a regular weight

Abstract

It is shown in quantitative terms that the maximal Bergman projection equation* P+ω(f)(z)=∫D f(ζ)|Bωz(ζ)|ω(ζ)\,dA(ζ), equation* is bounded from Lp to Lpη if and only if equation* 0<r<1(∫0rη(s)(∫s1ω(t)\,dt)p\,ds)1p (∫r1(ω(s)(s)1p)p'ds)1p'<∞, equation* provided ω,,η are radial regular weights. A radial weight σ is regular if it satisfies σ(r)∫r1σ(t)\,dt/(1-r) for all 0≤ r<1. It is also shown that under an appropriate additional hypothesis involving ω and η, the Bergman projection Pω and P+ω are simultaneously bounded.