On linear sections of orthogonally additive operators

A. Gumenchuk; I. Krasikova; M. Popov

doi:10.30970/ms.58.1.94-102

Математичні Студії (Oct 2022)

On linear sections of orthogonally additive operators

A. Gumenchuk,
I. Krasikova,
M. Popov

Affiliations

A. Gumenchuk: Department of Biological Physics and Medical Informatics, Bukovinian State Medical University
I. Krasikova: Zaporizhzhya National University
M. Popov: Pomeranian University in Słupsk, Słupsk

DOI: https://doi.org/10.30970/ms.58.1.94-102
Journal volume & issue: Vol. 58, no. 1
pp. 94 – 102

Abstract

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Our first result asserts that, for linear regular operators acting from a Riesz space with the principal projection property to a Banach lattice with an order continuous norm, the $C$-compactness is equivalent to the $AM$-compactness. Next we prove that, under mild assumptions, every linear section of a $C$-compact orthogonally additive operator is $AM$-compact, and every linear section of a narrow orthogonally additive operator is narrow.

Published in Математичні Студії

ISSN: 1027-4634 (Print); 2411-0620 (Online)
Publisher: Ivan Franko National University of Lviv
Country of publisher: Ukraine
LCC subjects: Science: Mathematics
Website: http://matstud.org.ua/ojs/index.php/matstud/index

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