Ces\`aro-like operator acting between Bloch type spaces

Abstract

Let μ be a finite positive Borel measure on the interval [0,1) and f(z)=Σn=0∞anzn ∈ H(D). The Ce\`asro-like operator is defined by Cμ(f)(z)=Σ∞n=0μn(Σnk=0ak)zn, \ z∈ D, where, for n≥ 0, μn denotes the n-th moment of the measure μ, that is, μn=∫[0, 1) tndμ(t). In this paper, we characterize the measures μ for which Cμ is bounded (compact) from one Bloch type space, Bα, into another one, Bβ.