Furtherance of Numerical radius inequalities of Hilbert space operators

TL;DR

This paper presents new and improved inequalities for the numerical radius of Hilbert space operators, expanding the theoretical understanding of operator bounds in functional analysis.

Contribution

It introduces generalized inequalities for the numerical radius that improve upon existing bounds for bounded linear operators on Hilbert spaces.

Findings

Derived new bounds for the numerical radius involving spectral radius and Crawford number.

Generalized and improved classical inequalities for operator numerical radius.

Provided tighter bounds for commutator and anticommutator operators.

Abstract

If $A,B$ are bounded linear operators on a complex Hilbert space, then % $w(A) \leq \frac{1}{2}\left( \|A\|+\sqrt{r\left(|A||A^*|\right)}\right)$ and $w(AB \pm BA)\leq 2\sqrt{2}\|B\|\sqrt{ w^2(A)-\frac{c^2(\Re (A))+c^2(\Im (A))}{2} },$ \begin{eqnarray*} w(A) &\leq& \frac{1}{2}\left( \|A\|+\sqrt{r\left(|A||A^*|\right)}\right),\\ w(AB \pm BA)&\leq& 2\sqrt{2}\|B\|\sqrt{ w^2(A)-\frac{c^2(\Re (A))+c^2(\Im (A))}{2} }, \end{eqnarray*} where $w(.),\|.\|,c(.)$ and $r(.)$ are the numerical radius, the operator norm, the Crawford number and the spectral radius respectively, and $\Re (A)$, $\Im (A)$ are the real part, the imaginary part of $A$ respectively. The inequalities obtained here generalize and improve on the existing well known inequalities.