A NOTE ON OPERATORS CONSISTENT IN INVERTIBILITY

Marko Kostadinov

DOI Number
https://doi.org/10.22190/FUMI1903429K
First page
429
Last page
438

Abstract


We generalize the notion of consistency in invertibility to Banach algebras and prove that the set of all elements consistent in invertibility is an upper semiregularity. In the case of bounded liner operators on a Hilbert space, we give a complete answer when the set of all <em>CI</em> operators will be a regularity. Analogous results are obtained for Fredholm consistent operators.


Keywords

Banach algebra; invertibility; semiregularity; Hilbert space.

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References


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DOI: https://doi.org/10.22190/FUMI1903429K

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