On $[m,C]$-Isometric Operators
Abstract
In this paper we introduce an $[m,C]$-isometric operator $T$ on a complex Hilbert space $\h$ and study its spectral properties. We show that if $T$ is an $[m,C]$-isometric operator and $N$ is an $n$-nilpotent operator, respectively, then $T+N$ is an $[m+2n-2, C]$-isometric operator.
Finally we give a short proof of Duggal's result for tensor product of $m$-isometries and give a similar result for $[m,C]$-isometric operators.
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