EMIS ELibM Electronic Journals PUBLICATIONS DE L'INSTITUT MATHÉMATIQUE (BEOGRAD) (N.S.)
Vol. 29(43), pp. 5--13 (1981)

Next Article

Contents of this Issue

Other Issues


ELibM Journals

ELibM Home

EMIS Home

 

$M$ -- PARANORMAL OPERATORS

S.C. Arora and Ramesh Kumar

Department of Mathematics, Hans Raj College, University of Delhi, Delhi 11007, India and Department of Mathematics, Khalsa College, University of Delhi, Delhi 11007, India

Abstract: V. Istratescu has recently defined $M$-paranormal operators on a Hilbert space $H$ as: An operator $T$ is called $M$-paranormal if for all $x\in H$ with $\|x\|=1$, $$ \|T^2 x\|\geqq\frac1M\|Tx\|^2 $$ We prove the following results: \item{1.} $T$ is $M$-paranormal if and only if $M^2T^*2T^2-2\lambda T^*T+\lambda^2 \geq 0$ for all $\lambda > 0$. \item{2.} If a $M$-paranormal operator $T$ double commutes with a hyponormal operator $S$, then the product $TS$ is $M$-paranormal. \item{3.} If a paranormal operator $T$ doble commutes with a $M$-hyponormal operator, then the product $TS$ is $M$-paranormal. \item{4.} If $T$ is invertible $M$-paranormal, then $T^{-1}$ is also $M$-paranormal. \item{5.} If $Re W (T) \leq 0$, where $W (T)$ denotes the numerical range of $T$, then $T$ is $M$-paranormal for $M \geq 8$. \item{6.} If a $M$-paranormal partial isometry $T$ satisfies $\|T\| \leq \frac1M$, then it is subnormal.

Full text of the article:


Electronic fulltext finalized on: 3 Nov 2001. This page was last modified: 16 Nov 2001.

© 2001 Mathematical Institute of the Serbian Academy of Science and Arts
© 2001 ELibM for the EMIS Electronic Edition