Geodesic
On the Range and the Kernel of the Elementary operators å A i XB i – X
Acta mathematica Universitatis Comenianae, Tome 72 (2003) no. 2 
S. Mecheri. On the Range and the Kernel of the Elementary operators å A i XB i – X. Acta mathematica Universitatis Comenianae, Tome 72 (2003) no. 2. http://geodesic.mathdoc.fr/item/AMUC_2003_72_2_a6/
@article{AMUC_2003_72_2_a6,
     author = {S. Mecheri},
     title = {On the {Range} and the {Kernel} of the {Elementary} operators \r{a} {A} i {XB} i – {X}},
     journal = {Acta mathematica Universitatis Comenianae},
     year = {2003},
     volume = {72},
     number = {2},
     url = {http://geodesic.mathdoc.fr/item/AMUC_2003_72_2_a6/}
}
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Voir la notice de l'article provenant de la source Comenius University

Let $B(H)$ denote the algebra of all bounded linear operators on a separable infinite dimensional complex Hilbert space $H$ into itself. For $% A=(A_{1},A_{2}...A_{n})$ \,and \,$B=(B_{1},B_{2}...B_{n})$ \ $n$-tuples in \,$B(H)$, \,we define the elementary operator $\Delta _{A,B}X:B(H)\mapsto B(H)$ by $% \Delta _{A,B}=\sum A_{i}XB_{i}-X.$ In this paper we show that if $\Delta _{A,B}=0=\Delta _{A,B}^{*},$ then $$\left\| T+\Delta _{A,B}(X)\right\| _{{\mathcal I}}\geq \left\| T\right\| _{{\mathcal I}}$$ for all $X\in {\mathcal I}$ (proper bilateral ideal) and for all $T\in \ker (\Delta _{A,B}\mid {\mathcal I})$.