International Journal of Statistics and Applied Mathematics
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2024, Vol. 9, Issue 5, Part A

Some results on n-power operators


Author(s): Augustine Masinde, Arthur Wafula and Stephen Luketero

Abstract: It is a well known result that 1-power normal operator is equivalent to normal operators. This paper will discuss some results on n-power normal operators on the Hilbert space. It is shown that if T is a diagonal matrix, then T is n-power normal for any integer n>2. We show that the product of two commuting 2- power normal operators is 2-power normal if each operator commutes with the adjoint of the other operator.

DOI: 10.22271/maths.2024.v9.i5a.1798

Pages: 21-27 | Views: 177 | Downloads: 25

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International Journal of Statistics and Applied Mathematics
How to cite this article:
Augustine Masinde, Arthur Wafula, Stephen Luketero. Some results on n-power operators. Int J Stat Appl Math 2024;9(5):21-27. DOI: 10.22271/maths.2024.v9.i5a.1798

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