A generalized Hilbert matrix acting on Hardy spaces

Abstract

If μ is a positive Borel measure on the interval [0, 1), the Hankel matrix Hμ =(μn,k)n,k 0 with entries μn,k=∫[0,1)tn+k\,dμ(t) induces formally the operator Hμ (f)(z)=Σn=0∞(Σk=0∞μn,kak)zn on the space of all analytic functions f(z)=Σk=0∞ akzk, in the unit disc D . In this paper we describe those measures μ for which Hμ is a bounded (compact) operator from Hp into Hq, 0<p,q<∞ . We also characterize the measures μ for which Hμ lies in the Schatten class Sp(H2), 1<p<∞.