A Derivative-Hilbert operator acting on BMOA space
Abstract
Let μ be a positive Borel measure on the interval [0,1). The Hankel matrix Hμ=(μn,k)n,k≥ 0 with entries μn,k=μn+k, where μn=∫[0,1)tndμ(t), induces, formally, the Derivative-Hilbert operator DHμ(f)(z)=Σn=0∞(Σk=0∞ μn,kak)(n+1)zn , ~z∈ D, where f(z)=Σn=0∞ anzn is an analytic function in D. We characterize the measures μ for which DHμ is a bounded operator on BMOA space. We also study the analogous problem from the α-Bloch space Bα(α>0) into the BMOA space.
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