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Some New Inequalities via Berezin Numbers

Mualla Birgül Huban, Hamdullah Başaran, Mehmet Gürdal

2022Turkish Journal of Mathematics and Computer Science21 citationsDOIOpen Access PDF

Abstract

The Berezin transform $\widetilde{T}$ and the Berezin radius of an operator $T$ on the reproducing kernel Hilbert space $\mathcal{H}\left( Q\right) $ over some set $Q$ with the reproducing kernel $K_{\eta}$ are defined, respectively, by \[ \widetilde{T}(\eta)=\left\langle {T\frac{K_{\eta}}{{\left\Vert K_{\eta }\right\Vert }},\frac{K_{\eta}}{{\left\Vert K_{\eta}\right\Vert }}% }\right\rangle ,\ \eta\in Q\text{ and }\mathrm{ber}(T):=\sup_{\eta\in Q}\left\vert \widetilde{T}{(\eta)}\right\vert . \] We study several sharp inequalities by using this bounded function $\widetilde{T},$ involving powers of the Berezin radius and the Berezin norms of reproducing kernel Hilbert space operators. We also give some inequalities regarding the Berezin transforms of sum of two operators.

Topics & Concepts

Hilbert spaceKernel (algebra)CombinatoricsMathematicsReproducing kernel Hilbert spaceOperator (biology)Space (punctuation)RADIUSMathematical analysisLinguisticsRepressorChemistryBiochemistryComputer securityGeneComputer scienceTranscription factorPhilosophyMathematical Inequalities and ApplicationsAnalytic and geometric function theoryMatrix Theory and Algorithms
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