an:06000380
Zbl 1248.47018
Krni??, Mario; Lovri??evi??, Neda; Pe??ari??, Josip
Jensen's operator and applications to mean inequalities for operators in Hilbert space
EN
Bull. Malays. Math. Sci. Soc. (2) 35, No. 1, 1-14 (2012).
00294251
2012
j
47A63 26D15
Jensen's inequality; Jensen's functional; Jensen's operator; Hilbert space; bounded self-adjoint operator; positive invertible operator; arithmetic operator mean; geometric operator mean; harmonic operator mean; superadditivity; monotonicity; refinement; conversion; Kantorovich constant
Let \(\mathcal{F}([a,b],\mathbb{R})\) denote the set of all continuous convex functions on an interval \([a,b]\). Then Jensen's operator \(\mathcal{J} : \mathcal{F}([a,b];\mathbb{R}) \times \mathcal{B}_h(H) \times [a,b] \times \mathbb{R}_+^2 \to \mathcal{B}_+(H)\) is defined by
\[
\mathcal{J}(f,D,\delta,p)=p_1f(D) + p_2f(\delta)I - (p_1 + p_2)f \left(\frac{p_1D+p_2\delta I}{p_1+p_2}\right),
\]
where \(p = (p_1,p_2)\), \(aI \leq D \leq bI\), and \(I\) denotes the identity operator on the Hilbert space \(H\). In this paper, the authors investigate some properties of Jensen's operator, find lower and upper bounds for it, and establish some bounds for the spectra of Jensen's operator by means of the discrete Jensen's functional (see [\textit{S. S. Dragomir}, \textit{J. E. Pe??ari??} and \textit{L.-E. Persson}, Acta Math. Hung. 70, No. 1--2, 129--143 (1996; Zbl 0847.26013)]) and finally get refinements of previously known mean inequalities for operators acting on Hilbert spaces.
Mohammad Sal Moslehian (Mashhad)
Zbl 0847.26013