___

• [1] E.H. Abood and M.A. Al-loz, On some generalization of normal operators on Hilbert space, Iraqi J. Sci. 56 (2C), 1786–1794, 2015.
• [2] E.H. Abood and M.A. Al-loz, On some generalizations of (n,m)-normal powers operators on Hilbert space, J. Progres. Res. Math. 7 (3), 1063–1070, 2016.
• [3] S.A. Alzuraiqi and A.B. Patel, On n-normal operators, Gen. Math. Notes 1 (2), 61–73, 2010.
• [4] M. Cho and B.N. Nactovska, Spectral properties of n-normal operators, Filomat, 32 (14), 5063–5069, 2018.
• [5] M. Cho, J.E. Lee, K. Tanahashic, and A. Uchiyamad, Remarks on n-normal operators, Filomat 32 (15), 5441–5451, 2018.
• [6] R.G. Douglas, On the operator equation $S^*XT = X $ and related topics, Acta Sci. Math. (Szeged) 30, 19–32, 1969.
• [7] B.P. Duggal, R.E. Harte, and I.H. Jeon, Polaroid operators and Weyl’s theorem, Proc. Amer. Math. Soc. 132, 1345–1349, 2004.
• [8] B.P. Duggal, Weyl’s theorem for totally hereditarily normaloid operators, Rend. Circ. Mat. Palermo (2) 53, 417–428, 2004.
• [9] H.G. Heuser, Functional Analysis, John Wiley and Sons., Chichester, 1982.
• [10] I.H. Jeon and B.P. Duggal, On operators with an absolute value condition, J. Korean Math. Soc. 41, 617–627, 2004.
• [11] I.H. Jeon and I.H. Kim, On operators satisfying $T^*|T^2|T\geq T^*|T|^2T$, Linear Algebra Appl. 418, 854–862, 2006.
• [12] A.A. Jibril, On n-power normal operators, Arab. J. Sci. Eng. 33 (2), 247–251, 2008.
• [13] S. Jung, E. Ko, and M.J. Leo, On class ${\mathcal{A}}$ operators, Studia Math. 198 (3), 249–260, 2010.
• [14] I.H. Kim, Weyl’s theorem and tensor product for operators satisfying $T^{*k } |T^2| T^k \geq T^{*k} |T|^2 T^k$, J. Korean Math. Soc. 47 (2), 351–361, 2010.
• [15] E. Ko, Algebraic and triangular n-hyponormal operator, Proc. Amer. Math. Soc. 123, 873–875, 1995.
• [16] J. Kyu Han, H. Youl Lee, and W. Young Lee, Invertible completions of $2\times2$ upper triangular operator matrices, Proc. Amer. Math. Soc. 128, 119–123, 1999.
• [17] K.B. Laursen and M.M. Neumann, An Introduction to Local Spectral Theory, Oxford University Press, 2000.
• [18] S.I. Mary and P. Vijaylakshmi, Fuglede-Putnam theorem and quasi-nilpotent part of n-normal operators, Tamkang J. Math. 46 (2), 151–165, 2015.
• [19] W. Mlak, Hyponormal contractions, Colloq. Math. 18, 137–141, 1967.
• [20] S. Panayappan, N. Jayanthi, and D. Sumathi, Weyl’s theorem and tensor product for class $A_k$ operators, Pure Math. Sci. 1 (1), 13–23. 2012.
• [21] M. Putinar, Quasisimilarity of tuples with Bishop’s property ($\beta$), Integral Equations Operator Theory 15, 1047–1052, 1992.
• [22] M.A. Rosenblum, On the operator equation $BX - XA = Q$, Duke Math. J. 23, 263–269, 1956.
• [23] T. Saito, Hyponormal operators and related topics, in: Lecture notes in Mathematics, 247, Springer-Verlag, 1971.
• [24] D. Senthilkumar, P. Maheswari Naik, and N. Sivakumar, Generalized Weyl’s theorem for algebraically k-quasi-paranormal operators, J. Chungcheong Math. Soc. 25 (4), 655–668, 2012.
• [25] O.A.M. Sid Ahmed and O.B. Sid Ahmed, On the classes of $(n, m)$-power $D$-normal and $(n, m)$-power $D$-quasi-normal operators, Oper. Matrices 13 (3), 705–732, 2019.
• [26] J. Stochel, Seminormality of operators from their tensor product, Proc. Amer. Math. Soc. 124, 435–440, 1996.
• [27] K. Tanahashi, I.H. Jeon, I.H. Kim, and A. Uchiyama, Quasinilpotent part of class A or $(p, k)$-quasihyponormal operators, Oper. Theory Adv. Appl. 187, 199–210, 2008.