Multipliers and integration operators between conformally invariant spaces

Abstract

In this paper we are concerned with two classes of conformally invariant spaces of analytic functions in the unit disc , the Besov spaces Bp (1 p<∞ ) and the Qs spaces (0<s<∞ ). Our main objective is to characterize for a given pair (X, Y) of spaces in these classes, the space of pointwise multipliers M(X, Y), as well as to study the related questions of obtaining characterizations of those g analytic in such that the Volterra operator Tg or the companion operator Ig with symbol g is a bounded operator from X into Y.