Multipliers of Dirichlet subspaces of the Bloch space

Abstract

For 0<p<∞ we let Dpp-1 denote the space of those functions f which are analytic in the unit disc D and satisfy ∫ D (1-| z|) p-1| f'(z)| p\,dA(z)<∞ . It is known that, whenever p≠ q, the only multiplier from Dpp-1 to Dqq-1 is the trivial one. However, if X is a subspace of the Bloch space and 0<p q<∞, then X Dpp-1⊂ X Dqq-1 , a fact which implies that the space of multipliers ( Dpp-1 X, Dqq-1 X) is non-trivial. In this paper we study the spaces of multipliers ( Dpp-1 X, v X) (0<p,q<∞ ) for distinct classical subspaces X of the Bloch space. Specifically, we shall take X to be H∞ , BMOA and the Bloch space B .