Composition operators followed by differentiation fromQK(q,p) spaces to Bloch-type spaces
DOI10.1080/17476933.2015.1075205zbMath1330.47036OpenAlexW2174106627MaRDI QIDQ3467524
Publication date: 2 February 2016
Published in: Complex Variables and Elliptic Equations (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/17476933.2015.1075205
boundednesscompactnessBloch-type spaces\(Q_{K}(p, q)\) spacescomposition operators followed by differentiation
Spaces of bounded analytic functions of one complex variable (30H05) Linear operators on function spaces (general) (47B38) Integral operators (47G10) Linear composition operators (47B33) Bloch spaces (30H30)
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Cites Work
- Essential norm estimate of a composition operator between Bloch-type spaces in the unit ball
- On a product-type operator from Bloch spaces to weighted-type spaces on the unit ball
- Some sufficient conditions for analytic functions to belong to \(\mathcal Q_{K,0}(p,q)\) space
- Composition followed by differentiation from \(H^{\infty }\) and the Bloch space to \(n\)th weighted-type spaces on the unit disk
- Bloch type spaces of analytic functions
- Compactness of composition operators on the Bloch space in classical bounded symmetric domains.
- \(Q_K\) type spaces of analytic functions
- On composition operators in \(Q_K\) type spaces
- WEIGHTED COMPOSITION OPERATORS FROM F(p, q, s) TO BLOCH TYPE SPACES ON THE UNIT BALL
- Compact composition operators on Besov spaces
- Compact Composition Operators on the Bloch Space
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