Hadamard gap series in weighted-type spaces on the unit ball

Abstract

We give a sufficient and necessary condition for an analytic function f(z) on the unit ball in n with Hadamard gaps, that is, for f(z)=Σk=1∞ Pnk(z) where Pnk(z) is a homogeneous polynomial of degree nk and nk+1/nk c>1 for all k ∈ , to belong to the weighted-type space H∞μ and the corresponding little weighted-type space H∞μ, 0, under some condition posed on the weighted funtion μ. We also study the growth rate of those functions in H∞μ. Finally, we characterize the boundedness and compactness of weighted composition operator from weighted-type space H∞μ to mixed norm spaces.