On (K*-N)n-Quasi Normal Operators
DOI:
https://doi.org/10.29304/jqcsm.2024.16.21564Keywords:
Operators, Normal Operators, Quasi-normal operator, K*Quasi-normal operatorsAbstract
The objective is to present a novel variant of a quasi-normal operator, specifically the quasi normal operator, alongside the introduction of related theorems, propositions, and illustrative examples elucidating this concept. Additionally, we present the necessary and sufficient conditions for addition and multiplication of this kind of operators.
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References
Arlen Brown, “On a class of operators,” Amer. Math. Soc., vol. 4, pp. 723–728, 1953.
ARUN BALA, “ A note on quasi normal operators,” INDIAN J. PURE APPL. MATH, vol. 8, no. 4, pp. 463–468, 1977.
S. Lohaj, “Quasi-normal operators,” Int. Journal of Math. Analysis, vol. 4, no. 47, pp. 2311–2320, 2010.
O. A. M. S. Ahmed and M. S. Ahmed, “On the class of n-power quasi-normal operators on Hilbert space,” Bull. Math. Anal. Appl, vol. 3, no. 2, pp. 213–228, 2011.
V. R. Hamiti, “Some Properties of N-Quasinormal Operators,” Gen, vol. 18, no. 1, pp. 94–98, 2013.
Laith K. Shaakir and Saad S. Marai, “quasi-normal Operator of order n,” Tikrit Journal of Pure Science, vol. 20, no. 4, pp. 167–169, 2015.
S. D. Muhsin and A. M. Khalaf, “On The Class of (KN)* Quasi-N-Normal Operators on Hilbert Space,” Iraqi Journal of science, pp. 2172–2176, 2017.
J. N. Sharma and A. R. Vasishtha, Functional Analysis, 1st ed. Krishna Prakashan Media, 2013.
T. Veluchamy and K. M. Manikandan, “n-Power quasi normal operators on the hilbert space,” IOSR Journal of Mathematics, vol. 12, pp. 6–9, 2016.
D. M. Salim and M. K. Ahmed, “On the class of (KN) quasi normal operator on Hilbert Space,” Mathematical theory and modeling, vol. 5, no. 10, 2015.
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