Abstract
First it is shown that the Nörlund matrix associated with the sequence of positive integers is a coposinormal operator on $\ell^2$. This fact then turns out to be useful for showing that this operator is also posinormal and hyponormal. In contrast with the analogous weighted mean matrix result [\textbf{6}], the proof of hyponormality is accomplished without resorting to determinants or Sylvester's criterion.
Citation
H. C. Rhaly Jr.. "The N\"{o}rlund operator on $\ell^2$ generated by the sequence of positive integers is hyponormal." Bull. Belg. Math. Soc. Simon Stevin 22 (5) 737 - 742, december 2015. https://doi.org/10.36045/bbms/1450389245
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