The Ces`aro-like operator on some analytic function spaces

Abstract

Let μ be a finite positive Borel measure on the interval [0, 1) and f(z)=Σn=0∞anzn ∈ H(D). The Ces\`aro-like operator is defined by Cμ (f)(z)=Σ∞n=0(μnΣnk=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). Let X and Y be subspaces of H( D), the purpose of this paper is to study the action of Cμ on distinct pairs (X, Y). The spaces considered in this paper are Hardy space Hp(0<p≤∞), Morrey space L2,λ(0<λ≤1), mean Lipschitz space, Bloch type space, etc.