Structures des Q–F–algèbres A vérifiant Ax = xAx, pour tout x in A

<p<We give a complete characterization of<em< Q-F</em<-algebras<em< A</em< which satisfy <em<Ax = xAx</em< for every <em<x</em< in <em<A</em<.</p<

Gespeichert in:

Autor*in:	Rachid Choukri [verfasserIn] Abdellah El Kinani [verfasserIn]

Format:	E-Artikel
Sprache:	Englisch ; Französisch ; Italienisch

Erschienen:	2008

Schlagwörter:	Q-algèbre F-algèbre Algèbre de Fréchet Idéal bilatère Idéal premie Idéal maximal Algèbre noethérienne

Übergeordnetes Werk:	In: Le Matematiche - Università degli Studi di Catania, 2010, 63(2008), 2, Seite 57-61
Übergeordnetes Werk:	volume:63 ; year:2008 ; number:2 ; pages:57-61

Links:	Link aufrufen Link aufrufen Journal toc Journal toc

Katalog-ID:	DOAJ046005749

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source	In Le Matematiche 63(2008), 2, Seite 57-61 volume:63 year:2008 number:2 pages:57-61
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topic_facet	Q-algèbre F-algèbre Algèbre de Fréchet Idéal bilatère Idéal premie Idéal maximal Algèbre noethérienne Mathematics
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author	Rachid Choukri
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topic_title	QA1-939 Structures des Q–F–algèbres A vérifiant Ax = xAx, pour tout x in A Q-algèbre F-algèbre Algèbre de Fréchet Idéal bilatère Idéal premie Idéal maximal Algèbre noethérienne
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title	Structures des Q–F–algèbres A vérifiant Ax = xAx, pour tout x in A
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title_auth	Structures des Q–F–algèbres A vérifiant Ax = xAx, pour tout x in A
abstract	<p<We give a complete characterization of<em< Q-F</em<-algebras<em< A</em< which satisfy <em<Ax = xAx</em< for every <em<x</em< in <em<A</em<.</p<
abstractGer	<p<We give a complete characterization of<em< Q-F</em<-algebras<em< A</em< which satisfy <em<Ax = xAx</em< for every <em<x</em< in <em<A</em<.</p<
abstract_unstemmed	<p<We give a complete characterization of<em< Q-F</em<-algebras<em< A</em< which satisfy <em<Ax = xAx</em< for every <em<x</em< in <em<A</em<.</p<
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title_short	Structures des Q–F–algèbres A vérifiant Ax = xAx, pour tout x in A
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