Generalized Hilbert Operator Acting on Bloch Type Spaces

Abstract

Let μ be a positive Borel measure on the interval [0,1). For α>0, the Hankel matrix Hμ,α=(μn,k,α)n,k≥ 0 with entries μn,k,α=∫[0,1)(n+α)n!(α)tn+kdμ(t) formally induces the operator Hμ,α(f)(z)=Σn=0∞(Σk=0∞ μn, k,α ak)zn on the space of all analytic functions f(z)=Σk=0∞akzk in the unit disc D. In this paper, we characterize the measures μ for which Hμ,α (α≥ 2) is a bounded (resp., compact) operator from the Bloch type space Bβ (0<β<∞) into Bα-1. We also give a necessary condition for which Hμ,α is a bounded operator by acting on Bloch type spaces for general cases.

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