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
Autor*in: |
Chauhan, Tarun Kumar [verfasserIn] |
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Format: |
E-Artikel |
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Sprache: |
Englisch |
Erschienen: |
2022transfer abstract |
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Schlagwörter: |
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Übergeordnetes Werk: |
Enthalten in: In silico drug repurposing in COVID-19: A network-based analysis - Sibilio, Pasquale ELSEVIER, 2021, Amsterdam [u.a.] |
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Übergeordnetes Werk: |
volume:505 ; year:2022 ; number:1 ; day:1 ; month:01 ; pages:0 |
Links: |
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DOI / URN: |
10.1016/j.jmaa.2021.125634 |
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ELV05521021X |
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10.1016/j.jmaa.2021.125634 doi /cbs_pica/cbs_olc/import_discovery/elsevier/einzuspielen/GBV00000000001524.pica (DE-627)ELV05521021X (ELSEVIER)S0022-247X(21)00713-7 DE-627 ger DE-627 rakwb eng 610 VZ 44.40 bkl Chauhan, Tarun Kumar verfasserin aut Strong Whitney and strong uniform convergences on a bornology 2022transfer abstract nicht spezifiziert zzz rdacontent nicht spezifiziert z rdamedia nicht spezifiziert zu rdacarrier 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. 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. Continuous convergence Elsevier Shielded from closed sets Elsevier Strong uniform convergence Elsevier Strong Whitney convergence Elsevier Bornology Elsevier Exhaustive net Elsevier Jindal, Varun oth Enthalten in Elsevier Sibilio, Pasquale ELSEVIER In silico drug repurposing in COVID-19: A network-based analysis 2021 Amsterdam [u.a.] (DE-627)ELV006634001 volume:505 year:2022 number:1 day:1 month:01 pages:0 https://doi.org/10.1016/j.jmaa.2021.125634 Volltext GBV_USEFLAG_U GBV_ELV SYSFLAG_U SSG-OLC-PHA SSG-OPC-PHA 44.40 Pharmazie Pharmazeutika VZ AR 505 2022 1 1 0101 0 |
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10.1016/j.jmaa.2021.125634 doi /cbs_pica/cbs_olc/import_discovery/elsevier/einzuspielen/GBV00000000001524.pica (DE-627)ELV05521021X (ELSEVIER)S0022-247X(21)00713-7 DE-627 ger DE-627 rakwb eng 610 VZ 44.40 bkl Chauhan, Tarun Kumar verfasserin aut Strong Whitney and strong uniform convergences on a bornology 2022transfer abstract nicht spezifiziert zzz rdacontent nicht spezifiziert z rdamedia nicht spezifiziert zu rdacarrier 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. 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. Continuous convergence Elsevier Shielded from closed sets Elsevier Strong uniform convergence Elsevier Strong Whitney convergence Elsevier Bornology Elsevier Exhaustive net Elsevier Jindal, Varun oth Enthalten in Elsevier Sibilio, Pasquale ELSEVIER In silico drug repurposing in COVID-19: A network-based analysis 2021 Amsterdam [u.a.] (DE-627)ELV006634001 volume:505 year:2022 number:1 day:1 month:01 pages:0 https://doi.org/10.1016/j.jmaa.2021.125634 Volltext GBV_USEFLAG_U GBV_ELV SYSFLAG_U SSG-OLC-PHA SSG-OPC-PHA 44.40 Pharmazie Pharmazeutika VZ AR 505 2022 1 1 0101 0 |
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10.1016/j.jmaa.2021.125634 doi /cbs_pica/cbs_olc/import_discovery/elsevier/einzuspielen/GBV00000000001524.pica (DE-627)ELV05521021X (ELSEVIER)S0022-247X(21)00713-7 DE-627 ger DE-627 rakwb eng 610 VZ 44.40 bkl Chauhan, Tarun Kumar verfasserin aut Strong Whitney and strong uniform convergences on a bornology 2022transfer abstract nicht spezifiziert zzz rdacontent nicht spezifiziert z rdamedia nicht spezifiziert zu rdacarrier 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. 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. Continuous convergence Elsevier Shielded from closed sets Elsevier Strong uniform convergence Elsevier Strong Whitney convergence Elsevier Bornology Elsevier Exhaustive net Elsevier Jindal, Varun oth Enthalten in Elsevier Sibilio, Pasquale ELSEVIER In silico drug repurposing in COVID-19: A network-based analysis 2021 Amsterdam [u.a.] (DE-627)ELV006634001 volume:505 year:2022 number:1 day:1 month:01 pages:0 https://doi.org/10.1016/j.jmaa.2021.125634 Volltext GBV_USEFLAG_U GBV_ELV SYSFLAG_U SSG-OLC-PHA SSG-OPC-PHA 44.40 Pharmazie Pharmazeutika VZ AR 505 2022 1 1 0101 0 |
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10.1016/j.jmaa.2021.125634 doi /cbs_pica/cbs_olc/import_discovery/elsevier/einzuspielen/GBV00000000001524.pica (DE-627)ELV05521021X (ELSEVIER)S0022-247X(21)00713-7 DE-627 ger DE-627 rakwb eng 610 VZ 44.40 bkl Chauhan, Tarun Kumar verfasserin aut Strong Whitney and strong uniform convergences on a bornology 2022transfer abstract nicht spezifiziert zzz rdacontent nicht spezifiziert z rdamedia nicht spezifiziert zu rdacarrier 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. 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. Continuous convergence Elsevier Shielded from closed sets Elsevier Strong uniform convergence Elsevier Strong Whitney convergence Elsevier Bornology Elsevier Exhaustive net Elsevier Jindal, Varun oth Enthalten in Elsevier Sibilio, Pasquale ELSEVIER In silico drug repurposing in COVID-19: A network-based analysis 2021 Amsterdam [u.a.] (DE-627)ELV006634001 volume:505 year:2022 number:1 day:1 month:01 pages:0 https://doi.org/10.1016/j.jmaa.2021.125634 Volltext GBV_USEFLAG_U GBV_ELV SYSFLAG_U SSG-OLC-PHA SSG-OPC-PHA 44.40 Pharmazie Pharmazeutika VZ AR 505 2022 1 1 0101 0 |
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10.1016/j.jmaa.2021.125634 doi /cbs_pica/cbs_olc/import_discovery/elsevier/einzuspielen/GBV00000000001524.pica (DE-627)ELV05521021X (ELSEVIER)S0022-247X(21)00713-7 DE-627 ger DE-627 rakwb eng 610 VZ 44.40 bkl Chauhan, Tarun Kumar verfasserin aut Strong Whitney and strong uniform convergences on a bornology 2022transfer abstract nicht spezifiziert zzz rdacontent nicht spezifiziert z rdamedia nicht spezifiziert zu rdacarrier 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. 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. Continuous convergence Elsevier Shielded from closed sets Elsevier Strong uniform convergence Elsevier Strong Whitney convergence Elsevier Bornology Elsevier Exhaustive net Elsevier Jindal, Varun oth Enthalten in Elsevier Sibilio, Pasquale ELSEVIER In silico drug repurposing in COVID-19: A network-based analysis 2021 Amsterdam [u.a.] (DE-627)ELV006634001 volume:505 year:2022 number:1 day:1 month:01 pages:0 https://doi.org/10.1016/j.jmaa.2021.125634 Volltext GBV_USEFLAG_U GBV_ELV SYSFLAG_U SSG-OLC-PHA SSG-OPC-PHA 44.40 Pharmazie Pharmazeutika VZ AR 505 2022 1 1 0101 0 |
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title_full |
Strong Whitney and strong uniform convergences on a bornology |
author_sort |
Chauhan, Tarun Kumar |
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In silico drug repurposing in COVID-19: A network-based analysis |
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In silico drug repurposing in COVID-19: A network-based analysis |
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Elektronische Aufsätze |
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Chauhan, Tarun Kumar |
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10.1016/j.jmaa.2021.125634 |
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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 |
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author2 |
Jindal, Varun |
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Jindal, Varun |
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