Abstract
Let0<p<∞, let-2<q<∞, and letφbe an analytic self-map of𝔻andg∈H(𝔻). The boundedness and compactness of generalized composition operators(Cφgf)(z)=∫0zf'(φ(ξ))g(ξ)dξ, z∈𝔻, f∈H(𝔻), fromℬμ(ℬμ,0) spaces toQK,ω(p,q)spaces are investigated.
Highlights
Introduction and PreliminariesLet φ be an analytic self-map of the open unit disc D of the complex plane C
In [19], generalized composition operator acting from Bloch-type spaces to mixed-norm space was studied
This paper is devoted to investigating the boundedness and compactness of generalized composition operators Cφg from Bμ (Bμ,0) spaces to QK,ω(p, q) spaces
Summary
Introduction and PreliminariesLet φ be an analytic self-map of the open unit disc D of the complex plane C. In [16], essential norms of generalized composition operators from Bloch type spaces to QK type spaces were given.
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