Double integral estimates for Besov type spaces and their applications

Abstract

For 0<p<∞, we give a complete description of nonnegative radial weight functions ω on the open unit disk D such that ∫D |f'(z)|p (1-|z|2)p-2ω(z)dA(z)<∞ if and only if ∫D∫D|f(z)-f(ζ)|p|1-ζz|4+τ+σ(1-|z|2)τ(1-|ζ|2)σω(ζ)dA(z)A(ζ)<∞ for all analytic functions f in D, where τ and σ are some real numbers. As applications, we give some geometric descriptions of functions in Besove type spaces Bp(ω) with doubling weights, and characterize the boundedness and compactness of Hankel type operators related to Besov type spaces with radial B\'ekoll\'e-Bonami weights. Some special cases of our results are new even for some standard weighted Besov spaces.