Spaces of analytic functions on the disc where the growth of \(M_ p(F,r)\) depends on a weight
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Publication:923761
DOI10.1016/0022-247X(90)90372-MzbMath0712.30043MaRDI QIDQ923761
Geraldo de Soares Souza, Oscar Blasco
Publication date: 1990
Published in: Journal of Mathematical Analysis and Applications (Search for Journal in Brave)
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Related Items (14)
Generalized Hilbert operators on weighted Bergman spaces ⋮ Characterization of Weighted Besov Spaces ⋮ On Blaschke products, Bloch functions and normal functions ⋮ On a theorem of Privalov and normal functions ⋮ An equivalence for weighted integrals of an analytic function and ist derivative ⋮ Mean Lipschitz conditions on Bergman space ⋮ On a logarithmic Hardy-Bloch type space ⋮ Mean Lipschitz spaces and a generalized Hilbert operator ⋮ Operators on weighted Bergman spaces \((0 < p \leqslant 1)\) and applications ⋮ Some results on mean Lipschitz spaces of analytic functions ⋮ Bibloch mappings and composition operators from Bloch type spaces to BMOA ⋮ Characterising extended Lipschitz type conditions with moduli of continuity ⋮ Operators and multipliers on weighted Bergman spaces ⋮ Analytic functions with \(H^p\)-derivative
Cites Work
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- Atomic decomposition of generalized Lipschitz spaces
- Generalizations of Lipschitz spaces and an application to Hardy spaces and bounded mean oscillation
- Mackey topologies, reproducing kernels, and diagonal maps on the Hardy and Berman spaces
- Weighted Lipschitz spaces and their analytic characterizations
- Some properties of fractional integrals. II
- Lipschitz spaces of functions on the circle and the disc
- Smooth functions
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