Maximal classes for -upper continuous functions
In this paper we present some properties of -upper continuous functions. We give a condition equivalent to -upper continuity and find maximal additive and maximalmultiplicative classes for the family of -upper continuous functions.These classes dependon whether or . To describe maximal additive and...
Ausführliche Beschreibung
Autor*in: |
Kowalczyk, Stanisław [verfasserIn] Nowakowska, Katarzyna [verfasserIn] |
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E-Artikel |
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Erschienen: |
Walter de Gruyter GmbH ; 2013 |
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21 |
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Walter de Gruyter Online Zeitschriften |
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Übergeordnetes Werk: |
Enthalten in: Journal of applied analysis - Berlin : de Gruyter, 1995, 19(2013), 1 vom: 04. Juni, Seite 69-89 |
Übergeordnetes Werk: |
volume:19 ; year:2013 ; number:1 ; day:04 ; month:06 ; pages:69-89 ; extent:21 |
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DOI / URN: |
10.1515/jaa-2013-0005 |
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NLEJ247061808 |
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10.1515/jaa-2013-0005 doi artikel_Grundlieferung.pp (DE-627)NLEJ247061808 DE-627 ger DE-627 rakwb Kowalczyk, Stanisław verfasserin aut Maximal classes for -upper continuous functions Walter de Gruyter GmbH 2013 21 Text txt rdacontent Computermedien c rdamedia Online-Ressource cr rdacarrier In this paper we present some properties of -upper continuous functions. We give a condition equivalent to -upper continuity and find maximal additive and maximalmultiplicative classes for the family of -upper continuous functions.These classes dependon whether or . To describe maximal additive and maximal multiplicative classes for 1-upper continuous function, we need the notions of sparsity and topology. Walter de Gruyter Online Zeitschriften Density of a set at a point continuous functions measurable functions path continuity -upper continuous functions Nowakowska, Katarzyna verfasserin aut Enthalten in Journal of applied analysis Berlin : de Gruyter, 1995 19(2013), 1 vom: 04. Juni, Seite 69-89 (DE-627)NLEJ248235915 (DE-600)2109549-8 1869-6082 nnns volume:19 year:2013 number:1 day:04 month:06 pages:69-89 extent:21 https://doi.org/10.1515/jaa-2013-0005 Deutschlandweit zugänglich GBV_USEFLAG_U ZDB-1-DGR GBV_NL_ARTICLE AR 19 2013 1 04 06 69-89 21 |
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10.1515/jaa-2013-0005 doi artikel_Grundlieferung.pp (DE-627)NLEJ247061808 DE-627 ger DE-627 rakwb Kowalczyk, Stanisław verfasserin aut Maximal classes for -upper continuous functions Walter de Gruyter GmbH 2013 21 Text txt rdacontent Computermedien c rdamedia Online-Ressource cr rdacarrier In this paper we present some properties of -upper continuous functions. We give a condition equivalent to -upper continuity and find maximal additive and maximalmultiplicative classes for the family of -upper continuous functions.These classes dependon whether or . To describe maximal additive and maximal multiplicative classes for 1-upper continuous function, we need the notions of sparsity and topology. Walter de Gruyter Online Zeitschriften Density of a set at a point continuous functions measurable functions path continuity -upper continuous functions Nowakowska, Katarzyna verfasserin aut Enthalten in Journal of applied analysis Berlin : de Gruyter, 1995 19(2013), 1 vom: 04. Juni, Seite 69-89 (DE-627)NLEJ248235915 (DE-600)2109549-8 1869-6082 nnns volume:19 year:2013 number:1 day:04 month:06 pages:69-89 extent:21 https://doi.org/10.1515/jaa-2013-0005 Deutschlandweit zugänglich GBV_USEFLAG_U ZDB-1-DGR GBV_NL_ARTICLE AR 19 2013 1 04 06 69-89 21 |
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10.1515/jaa-2013-0005 doi artikel_Grundlieferung.pp (DE-627)NLEJ247061808 DE-627 ger DE-627 rakwb Kowalczyk, Stanisław verfasserin aut Maximal classes for -upper continuous functions Walter de Gruyter GmbH 2013 21 Text txt rdacontent Computermedien c rdamedia Online-Ressource cr rdacarrier In this paper we present some properties of -upper continuous functions. We give a condition equivalent to -upper continuity and find maximal additive and maximalmultiplicative classes for the family of -upper continuous functions.These classes dependon whether or . To describe maximal additive and maximal multiplicative classes for 1-upper continuous function, we need the notions of sparsity and topology. Walter de Gruyter Online Zeitschriften Density of a set at a point continuous functions measurable functions path continuity -upper continuous functions Nowakowska, Katarzyna verfasserin aut Enthalten in Journal of applied analysis Berlin : de Gruyter, 1995 19(2013), 1 vom: 04. Juni, Seite 69-89 (DE-627)NLEJ248235915 (DE-600)2109549-8 1869-6082 nnns volume:19 year:2013 number:1 day:04 month:06 pages:69-89 extent:21 https://doi.org/10.1515/jaa-2013-0005 Deutschlandweit zugänglich GBV_USEFLAG_U ZDB-1-DGR GBV_NL_ARTICLE AR 19 2013 1 04 06 69-89 21 |
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10.1515/jaa-2013-0005 doi artikel_Grundlieferung.pp (DE-627)NLEJ247061808 DE-627 ger DE-627 rakwb Kowalczyk, Stanisław verfasserin aut Maximal classes for -upper continuous functions Walter de Gruyter GmbH 2013 21 Text txt rdacontent Computermedien c rdamedia Online-Ressource cr rdacarrier In this paper we present some properties of -upper continuous functions. We give a condition equivalent to -upper continuity and find maximal additive and maximalmultiplicative classes for the family of -upper continuous functions.These classes dependon whether or . To describe maximal additive and maximal multiplicative classes for 1-upper continuous function, we need the notions of sparsity and topology. Walter de Gruyter Online Zeitschriften Density of a set at a point continuous functions measurable functions path continuity -upper continuous functions Nowakowska, Katarzyna verfasserin aut Enthalten in Journal of applied analysis Berlin : de Gruyter, 1995 19(2013), 1 vom: 04. Juni, Seite 69-89 (DE-627)NLEJ248235915 (DE-600)2109549-8 1869-6082 nnns volume:19 year:2013 number:1 day:04 month:06 pages:69-89 extent:21 https://doi.org/10.1515/jaa-2013-0005 Deutschlandweit zugänglich GBV_USEFLAG_U ZDB-1-DGR GBV_NL_ARTICLE AR 19 2013 1 04 06 69-89 21 |
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10.1515/jaa-2013-0005 doi artikel_Grundlieferung.pp (DE-627)NLEJ247061808 DE-627 ger DE-627 rakwb Kowalczyk, Stanisław verfasserin aut Maximal classes for -upper continuous functions Walter de Gruyter GmbH 2013 21 Text txt rdacontent Computermedien c rdamedia Online-Ressource cr rdacarrier In this paper we present some properties of -upper continuous functions. We give a condition equivalent to -upper continuity and find maximal additive and maximalmultiplicative classes for the family of -upper continuous functions.These classes dependon whether or . To describe maximal additive and maximal multiplicative classes for 1-upper continuous function, we need the notions of sparsity and topology. Walter de Gruyter Online Zeitschriften Density of a set at a point continuous functions measurable functions path continuity -upper continuous functions Nowakowska, Katarzyna verfasserin aut Enthalten in Journal of applied analysis Berlin : de Gruyter, 1995 19(2013), 1 vom: 04. Juni, Seite 69-89 (DE-627)NLEJ248235915 (DE-600)2109549-8 1869-6082 nnns volume:19 year:2013 number:1 day:04 month:06 pages:69-89 extent:21 https://doi.org/10.1515/jaa-2013-0005 Deutschlandweit zugänglich GBV_USEFLAG_U ZDB-1-DGR GBV_NL_ARTICLE AR 19 2013 1 04 06 69-89 21 |
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In this paper we present some properties of -upper continuous functions. We give a condition equivalent to -upper continuity and find maximal additive and maximalmultiplicative classes for the family of -upper continuous functions.These classes dependon whether or . To describe maximal additive and maximal multiplicative classes for 1-upper continuous function, we need the notions of sparsity and topology. |
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In this paper we present some properties of -upper continuous functions. We give a condition equivalent to -upper continuity and find maximal additive and maximalmultiplicative classes for the family of -upper continuous functions.These classes dependon whether or . To describe maximal additive and maximal multiplicative classes for 1-upper continuous function, we need the notions of sparsity and topology. |
abstract_unstemmed |
In this paper we present some properties of -upper continuous functions. We give a condition equivalent to -upper continuity and find maximal additive and maximalmultiplicative classes for the family of -upper continuous functions.These classes dependon whether or . To describe maximal additive and maximal multiplicative classes for 1-upper continuous function, we need the notions of sparsity and topology. |
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