Refined numerical radius estimates and Euclidean operator radius

Q2 Mathematics

Annali dell''Universita di Ferrara Pub Date : 2026-05-09 DOI:10.1007/s11565-026-00691-8

Pintu Bhunia, Rukaya Majeed

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引用次数: 0

Abstract

We obtain new lower and upper bounds for the numerical radius of a bounded linear operator A on a complex Hilbert space, which refine the existing ones. In particular, if w(A) and $\Vert A\Vert $ denote the numerical radius and operator norm of A, respectively, then we show that

$$\begin{aligned} \nu (A) + \frac{1}{4} \left\| |A|^2+|A^*|^2\right\|\le & w^2(A) \le \frac{1}{2} w\left( \frac{|A|+|A^*|}{2}A \right) \\ & + \frac{1}{4} \left\| |A|^2+ \left( \frac{|A|+|A^*|}{2}\right) ^2 \right\| , \end{aligned}$$

where $\nu (A)\ge 0$ is a real number involving the operator norm of the Cartesian decomposition of A. We also develop several new numerical radius inequalities for the products and sums of operators via Euclidean operator radius of 2-tuples of operators. In addition, we deduce equality characterizations for the inequalities. As an application, we obtain numerical radius inequalities for the commutators of operators, which improves the Fong and Holbrook’s inequality $w(AB\pm BA) \le 2\sqrt{2} w(A) \Vert B\Vert $ [Canadian J. Math. 1983].

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改进的数值半径估计和欧几里得算子半径

得到复Hilbert空间上有界线性算子a数值半径的新的下界和上界，对已有的下界和上界进行了改进。特别地，如果w(A)和$\Vert A\Vert $分别表示A的数值半径和算子范数，那么我们证明$$\begin{aligned} \nu (A) + \frac{1}{4} \left\| |A|^2+|A^*|^2\right\|\le & w^2(A) \le \frac{1}{2} w\left( \frac{|A|+|A^*|}{2}A \right) \\ & + \frac{1}{4} \left\| |A|^2+ \left( \frac{|A|+|A^*|}{2}\right) ^2 \right\| , \end{aligned}$$其中$\nu (A)\ge 0$是涉及A的笛卡尔分解的算子范数的实数。我们还通过2元算子组的欧几里得算子半径为算子的积和提出了几个新的数值半径不等式。此外，我们还推导出不等式的等式特征。作为应用，我们得到了算子的换向子的数值半径不等式，改进了Fong和Holbrook的不等式$w(AB\pm BA) \le 2\sqrt{2} w(A) \Vert B\Vert $ [Canadian J. Math. 1983]。

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来源期刊

Annali dell''Universita di Ferrara Mathematics-Mathematics (all)

CiteScore

1.70

自引率

0.00%

发文量

期刊介绍： Annali dell''Università di Ferrara is a general mathematical journal publishing high quality papers in all aspects of pure and applied mathematics. After a quick preliminary examination, potentially acceptable contributions will be judged by appropriate international referees. Original research papers are preferred, but well-written surveys on important subjects are also welcome.