Ces\`aro-type operators acting on Dirichlet spaces

Abstract

If (η )=\ ηn\ n=0∞ is a sequence of complex numbers, the Ces\`aro-type operator C(η ) is formally defined in the space of analytic funtions in the unit disc D as follows: If f is an analytic function in D, f(z)=Σn=0∞ anzn (z∈ D), then C(η )(f) is formally defined by C(η )(f)(z)= C\ηn\(f)(z)=Σn=0∞ η n (Σk=0nak )zn. The operator C(η ) is a natural generalization of the Ces\`aro operator. For each α∈ R we let D2α be the space of functions f∈( D) such that |a0|2+Σn=1∞ n1-α |an|2<∞ wheref(z)=Σn=0∞ anzn. In this paper we give a complete characterization of the sequences of complex numbers (η ) for which the operator C(η ) is bounded (compact) from D2α into D2β for any α , β ∈ R.