Superposition operators, Hardy spaces, and Dirichlet type spaces

Abstract

For 0<p<∞ and α >-1 the space of Dirichlet type Dpα consists of those functions f which are analytic in the unit disc D and satisfy ∫ D(1-| z| )α| f (z)| p\,dA(z)<∞ . The space is the closest one to the Hardy space Hp among all the Dpα . Our main object in this paper is studying similarities and differences between the spaces Hp and (0<p<∞ ) regarding superposition operators. Namely, for 0<p<∞ and 0<s<∞ , we characterize the entire functions such that the superposition operator S with symbol maps the conformally invariant space Qs into the space , and, also, those which map into Qs and we compare these results with the corresponding ones with Hp in the place of . We also study the more general question of characterizing the superposition operators mapping Dpα into Qs and Qs into Dpα , for any admissible triplet of numbers (p, α , s).