Generalized Volterra‐type operators on generalized Fock spaces
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Publication:6093910
DOI10.1002/mana.202000014zbMath1523.30069WikidataQ114235671 ScholiaQ114235671MaRDI QIDQ6093910
Publication date: 9 October 2023
Published in: Mathematische Nachrichten (Search for Journal in Brave)
Cites Work
- Integral operators, embedding theorems and a Littlewood-Paley formula on weighted Fock spaces
- Generalized Volterra companion operators on Fock spaces
- Product of Volterra type integral and composition operators on weighted Fock spaces
- Characterization for Fock-type space via higher order derivatives and its application
- Sampling and interpolation in large Bergman and Fock spaces
- Products of Volterra type operator and composition operator from \(H^\infty \)and Bloch spaces to Zygmund spaces
- Pointwise estimates for the Bergman kernel of the weighted Fock space
- Pointwise estimates for the weighted Bergman projection kernel in \({\mathbb C}^n\), using a weighted \(L^2\) estimate for the \(\bar\partial\) equation
- Embedding theorems for spaces of analytic functions via Khinchine's inequality
- Interpolating and sampling sequences for entire functions
- Bergman spaces with exponential weights
- Integral, differential and multiplication operators on generalized Fock spaces
- Weighted composition operators between large Fock spaces in several complex variables
- Generalized composition operators on Zygmund spaces and Bloch type spaces
- $C^\infty$ approximations of convex, subharmonic, and plurisubharmonic functions
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