Strong Whitney and strong uniform convergences on a bornology

For any two metric spaces ( X , d ) , ( Y , ρ ) and a bornology B on X, we study the relationship between strong uniform convergence (introduced by Beer and Levi in ) and strong Whitney convergence (introduced by A. Caserta in ) on B on Y X (and C ( X , Y ) ). The relationships of these convergences...
Ausführliche Beschreibung

Gespeichert in:

Autor*in:	Chauhan, Tarun Kumar [verfasserIn] Jindal, Varun

Format:	E-Artikel
Sprache:	Englisch

Erschienen:	2022transfer abstract

Schlagwörter:	Continuous convergence Shielded from closed sets Strong uniform convergence Strong Whitney convergence Bornology Exhaustive net

Übergeordnetes Werk:	Enthalten in: In silico drug repurposing in COVID-19: A network-based analysis - Sibilio, Pasquale ELSEVIER, 2021, Amsterdam [u.a.]
Übergeordnetes Werk:	volume:505 ; year:2022 ; number:1 ; day:1 ; month:01 ; pages:0

Links:	Volltext

DOI / URN:	10.1016/j.jmaa.2021.125634

Katalog-ID:	ELV05521021X

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author	Chauhan, Tarun Kumar
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author-letter	Chauhan, Tarun Kumar
doi_str_mv	10.1016/j.jmaa.2021.125634
dewey-full	610
title_sort	strong whitney and strong uniform convergences on a bornology
title_auth	Strong Whitney and strong uniform convergences on a bornology
abstract	For any two metric spaces ( X , d ) , ( Y , ρ ) and a bornology B on X, we study the relationship between strong uniform convergence (introduced by Beer and Levi in ) and strong Whitney convergence (introduced by A. Caserta in ) on B on Y X (and C ( X , Y ) ). The relationships of these convergences with their classical counterparts, that is, Whitney and uniform convergences on B are also considered. Moreover, for any two bornologies B and B ′ on X, we examine the relationship between strong Whitney (strong uniform) convergence on B ′ and Whitney (uniform) convergence on B . Finally, we investigate the relation of strong Whitney convergence with the well-known continuous convergence of nets of functions.
abstractGer	For any two metric spaces ( X , d ) , ( Y , ρ ) and a bornology B on X, we study the relationship between strong uniform convergence (introduced by Beer and Levi in ) and strong Whitney convergence (introduced by A. Caserta in ) on B on Y X (and C ( X , Y ) ). The relationships of these convergences with their classical counterparts, that is, Whitney and uniform convergences on B are also considered. Moreover, for any two bornologies B and B ′ on X, we examine the relationship between strong Whitney (strong uniform) convergence on B ′ and Whitney (uniform) convergence on B . Finally, we investigate the relation of strong Whitney convergence with the well-known continuous convergence of nets of functions.
abstract_unstemmed	For any two metric spaces ( X , d ) , ( Y , ρ ) and a bornology B on X, we study the relationship between strong uniform convergence (introduced by Beer and Levi in ) and strong Whitney convergence (introduced by A. Caserta in ) on B on Y X (and C ( X , Y ) ). The relationships of these convergences with their classical counterparts, that is, Whitney and uniform convergences on B are also considered. Moreover, for any two bornologies B and B ′ on X, we examine the relationship between strong Whitney (strong uniform) convergence on B ′ and Whitney (uniform) convergence on B . Finally, we investigate the relation of strong Whitney convergence with the well-known continuous convergence of nets of functions.
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title_short	Strong Whitney and strong uniform convergences on a bornology
url	https://doi.org/10.1016/j.jmaa.2021.125634
remote_bool	true
author2	Jindal, Varun
author2Str	Jindal, Varun
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isOA_txt	false
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author2_role	oth
doi_str	10.1016/j.jmaa.2021.125634
up_date	2024-07-06T16:55:35.055Z
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