2018
DOI: 10.2298/fil1815421b
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A characterization of unbounded generalized meromorphic operators

Abstract: In this paper, we study the class of unbounded generalized meromorphic operators GM(E, ∞), where E is a finite subset of C, which generalizes the notion of unbounded meromorphic operators. More precisely, we give a decomposition and some characterizing properties of these operators based on the punctured neighborhood theorem and the operational calculus for unbounded operators.

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Cited by 2 publications
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“…Proof. If M = I, then we obtain the result established in [7]. If M = I, then the fact that T is a semi B-Fredholm operator, this implies from Proposition 2.1, the existence of two T-invariant closed subspaces X 0 and X 1 such that…”
Section: Stability Of Some Essential B-spectra Of Pencil Operatorssupporting
confidence: 65%
“…Proof. If M = I, then we obtain the result established in [7]. If M = I, then the fact that T is a semi B-Fredholm operator, this implies from Proposition 2.1, the existence of two T-invariant closed subspaces X 0 and X 1 such that…”
Section: Stability Of Some Essential B-spectra Of Pencil Operatorssupporting
confidence: 65%