Some norm inequalities for accretive Hilbert space operators

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DOI:

https://doi.org/10.56754/0719-0646.2602.327

Abstract

New norm inequalities for accretive operators on Hilbert space are given. Among other inequalities, we prove that if \(A, B \in \mathbb{B(H)}\) and \(B\) is self-adjoint and also \(C_{m,M}(iAB)\) is accretive, then


\begin{eqnarray*}
\frac{4 \sqrt{Mm}}{M+m} \Vert AB\Vert \leq \omega(AB-BA^*),\end{eqnarray*}
where \(M\) and \(m\) are positive real numbers with \(M > m\) and \(C_{m,M}(A) = (A^* - mI)(MI - A)\). Also, we show that if \(C_{m,M}(A)\) is accretive and \((M-m) \leq k \Vert A \Vert\), then


\begin{eqnarray*}
\omega(AB) \leq ( 2 + k)\omega(A)\omega(B).\end{eqnarray*}

Keywords

Bounded linear operator , Hilbert space , norm inequality , numerical radius

Mathematics Subject Classification:

47A12 , 47A30 , 47A63
  • Pages: 327–340
  • Date Published: 2024-08-09
  • Vol. 26 No. 2 (2024)

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Published

2024-08-09

How to Cite

[1]
B. Moosavi and M. Shah Hosseini, “Some norm inequalities for accretive Hilbert space operators”, CUBO, vol. 26, no. 2, pp. 327–340, Aug. 2024.

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