A functional associated with two bounded linear operators in Hilbert spaces and related inequalities (Q2881409)

Let \(\mathfrak{H}\) be a complex Hilbert space, \(\mathcal{L}(\mathfrak{H})\) be the Banach algebra of all bounded linear operators on \(\mathfrak{H}\). Given \(A,B\in \mathcal{L}(\mathfrak{H})\), the author defines the functional NEWLINE\[NEWLINE\mu(A,B)=\sup\{ \|Ax\|\|Bx\| : x\in\mathfrak{H},\;\|x\|=1\}NEWLINE\]NEWLINE and gives several inequalities for the functional involving the uniform norm and the numerical radius of operators, as in general cases and so for operators for which the transform \(C_{\alpha,\beta}(A,B):= (A^{*}- \overline{\alpha} B^{*} )( \beta B-A)\) with given scalars \(\alpha, \beta \in \mathbb{C}\) is accretive (i.e., \((C_{\alpha,\beta} (A,B)x, x)\geq 0\) for any \(x \in \mathfrak{H} \)), and operators \(T\in \mathcal{L}(\mathfrak{H})\) satisfying the uniform \((\alpha, \beta)\)-property (i.e., for given \(\alpha, \beta \in \mathbb{C}\) with \(\alpha \neq \beta \) and any \(x , y \in \mathfrak{H}\) with \(\|x\|=\|y\|=1\), the inequality \(\operatorname{Re}(\beta y - Tx,Tx- \alpha y)\geq 0\) holds).