Generalized Hilbert operators on weighted Bergman spaces

Abstract

The main purpose of this paper is to study the generalized Hilbert operator equation* Hg(f)(z)=∫01f(t)g'(tz)\,dt equation* acting on the weighted Bergman space Ap, where the weight function belongs to the class of regular radial weights and satisfies the Muckenhoupt type condition equationMpconditionaabstract 0 r<1(∫r1(∫t1(s)ds)-p'p\,dt)pp' ∫0r(1-t)-p(∫t1(s)ds)\,dt<∞. equation If q=p, the condition on g that characterizes the boundedness (or the compactness) of : Ap Aq depends on p only, but the situation is completely different in the case q p in which the inducing weight plays a crucial role. The results obtained also reveal a natural connection to the Muckenhoupt type condition Mpconditionaabstract. Indeed, it is shown that the classical Hilbert operator (the case g(z)=11-z of g) is bounded from Lp∫t1(s)\,ds([0,1)) (the natural restriction of Ap to functions defined on [0,1)) to Ap if and only if satisfies the condition Mpconditionaabstract. On the way to these results decomposition norms for the weighted Bergman space Ap are established.