介于贝雷津半径和贝雷津规范之间的新半规范族

IF 1.2 4区 数学 Q2 MATHEMATICS, APPLIED Acta Applicandae Mathematicae Pub Date : 2024-07-03 DOI:10.1007/s10440-024-00667-w
Mojtaba Bakherad, Cristian Conde, Fuad Kittaneh
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引用次数: 0

摘要

函数式希尔伯特空间是某个集合 \(\Theta \subseteq \mathbb{C}\)上的复值函数的希尔伯特空间ℋ,使得在ℋ上的评估函数 \(\varphi _{tau }\left ( f\right ) =f\left ( \tau \right ) \)、 \(\tau \in \Theta \)是连续的。一个算子 \(X\) 的贝雷津数定义为 \(\mathbf{ber}(X)=\underset{tau \ in {\Theta } }{sup }\b\widetilde{X}(\tau)\big\vert = \underset{tau \in {\Theta }其中算子\(X\)作用于某个(非空)集合\(\Theta\)上的重现核希尔伯特空间({\mathscr{H}={mathscr{H}(}\Theta)\)。在本文中,我们在贝雷津半径和贝雷津规范之间引入了一个涉及手段 \(\Vert \cdot \Vert _{\sigma _{t}}\) 的新族。在其他结果中,我们发现如果 \(X\in {\mathscr{L}}({\mathscr{H}})\) 和 \(f\), \(g\) 是定义在 \([0,\infty )\) 上的两个非负连续函数,使得 \(f(t)g(t) = t,\,(t\geqslant 0)\),那么 $$$begin{aligned}。\Vert X\Vert ^{2}_{\sigma }\leqslant \textbf{ber}\left (\frac{1}{4}(f^{4}( \vert X\vert )+g^{4}(\vert X^{*}\vert ))+\frac{1}{2}\vert X\vert ^{2}\right )\right )\end{aligned}$$ 和 $$\begin{aligned}\X\Vert ^{2}_{sigma }\leqslant \frac{1}{2}\sqrt\textbf{ber}\left (f^{4}(\vert X\vert )+g^{2}(\vert X\vert ^{2})\right )\textbf{ber}\left (f^{2}(\vert X\vert ^{2})+g^{4}(\vert X^{*}\vert ) \right )}, \end{aligned}$$ 其中 \(\sigma \)是由算术平均数 \(\nabla \)支配的平均数。
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A New Family of Semi-Norms Between the Berezin Radius and the Berezin Norm

A functional Hilbert space is the Hilbert space ℋ of complex-valued functions on some set \(\Theta \subseteq \mathbb{C}\) such that the evaluation functionals \(\varphi _{\tau }\left ( f\right ) =f\left ( \tau \right ) \), \(\tau \in \Theta \), are continuous on ℋ. The Berezin number of an operator \(X\) is defined by \(\mathbf{ber}(X)=\underset{\tau \in {\Theta } }{\sup }\big \vert \widetilde{X}(\tau )\big \vert = \underset{\tau \in {\Theta } }{\sup }\big \vert \langle X\hat{k}_{\tau },\hat{k}_{\tau }\rangle \big \vert \), where the operator \(X\) acts on the reproducing kernel Hilbert space \({\mathscr{H}}={\mathscr{H}(}\Theta )\) over some (non-empty) set \(\Theta \). In this paper, we introduce a new family involving means \(\Vert \cdot \Vert _{\sigma _{t}}\) between the Berezin radius and the Berezin norm. Among other results, it is shown that if \(X\in {\mathscr{L}}({\mathscr{H}})\) and \(f\), \(g\) are two non-negative continuous functions defined on \([0,\infty )\) such that \(f(t)g(t) = t,\,(t\geqslant 0)\), then

$$\begin{aligned} \Vert X\Vert ^{2}_{\sigma }\leqslant \textbf{ber}\left (\frac{1}{4}(f^{4}( \vert X\vert )+g^{4}(\vert X^{*}\vert ))+\frac{1}{2}\vert X\vert ^{2} \right ) \end{aligned}$$

and

$$\begin{aligned} \Vert X\Vert ^{2}_{\sigma }\leqslant \frac{1}{2}\sqrt{\textbf{ber} \left (f^{4}(\vert X\vert )+g^{2}(\vert X\vert ^{2})\right ) \textbf{ber}\left (f^{2}(\vert X\vert ^{2})+g^{4}(\vert X^{*}\vert ) \right )}, \end{aligned}$$

where \(\sigma \) is a mean dominated by the arithmetic mean \(\nabla \).

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来源期刊
Acta Applicandae Mathematicae
Acta Applicandae Mathematicae 数学-应用数学
CiteScore
2.80
自引率
6.20%
发文量
77
审稿时长
16.2 months
期刊介绍: Acta Applicandae Mathematicae is devoted to the art and techniques of applying mathematics and the development of new, applicable mathematical methods. Covering a large spectrum from modeling to qualitative analysis and computational methods, Acta Applicandae Mathematicae contains papers on different aspects of the relationship between theory and applications, ranging from descriptive papers on actual applications meeting contemporary mathematical standards to proofs of new and deep theorems in applied mathematics.
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