Two weight inequality for Hankel form on weighted Bergman spaces induced by doubling weights

Abstract

The boundedness of the small Hankel operator hf(g)=P(fg), induced by an analytic symbol f and the Bergman projection P associated to , acting from the weighted Bergman space Ap to Aq is characterized on the full range 0<p,q<∞ when ω, belong to the class D of radial weights admitting certain two-sided doubling conditions. Certain results obtained are equivalent to the boundedness of bilinear Hankel forms, which are in turn used to establish the weak factorization Aηq=Aωp1 Ap2, where 1<q,p1,p2<∞ such that q-1=p1-1+p2-1 and η1qω1p11p2. Here τ(r)=∫r1τ(t)\,dt/(1-t) for all 0 r<1.