Ali Zamani
Published 2020-04-28Version 1
We introduce the $\lambda$-mean transform $M_{\lambda}(T)$ of a Hilbert space operator $T$ as an extension of some operator transforms based on the Duggal transform $T^D$ by $M_{\lambda}(T) := \lambda T + (1-\lambda)T^D$, and present some of its essentially properties. Among other things, we obtain estimates for the operator norm and numerical radius of the $\lambda$-mean transform $M_{\lambda}(T)$ in terms of the original operator $T$.
Comments: It is submitted on 26 Feb 2020 to a research journal
On the image of the mean transform
Left m-invertibility by the adjoint of Drazin inverse and m-selfadjointness of Hilbert space operators
Operator norm and numerical radius analogues of Cohen's inequality
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