Abstract

On the one hand, we generalize some results known for composition operators on Hardy spaces to the case of Hardy–Orlicz spaces H^\Psi : construction of a “slow” Blaschke product giving a non-compact composition operator on H^\Psi and yet “nowhere differentiable”; construction of a surjective symbol whose associated composition operator is compact on H^\Psi and is, moreover, in all Schatten classes S_p (H^2) , p > 0 . On the other hand, we revisit the classical case of composition operators on H^2 , giving first a new, and simpler, characterization of composition operators with closed range, and then showing directly the equivalence of the two characterizations of membership in Schatten classes of Luecking, and Luecking–Zhu.