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image/svg+xml Jakob Voss, based on art designer at PLoS, modified by Wikipedia users Nina and Beao Closed Access logo, derived from PLoS Open Access logo. This version with transparent background. http://commons.wikimedia.org/wiki/File:Closed_Access_logo_transparent.svg Jakob Voss, based on art designer at PLoS, modified by Wikipedia users Nina and Beao Israel Journal of Ma...arrow_drop_down
image/svg+xml Jakob Voss, based on art designer at PLoS, modified by Wikipedia users Nina and Beao Closed Access logo, derived from PLoS Open Access logo. This version with transparent background. http://commons.wikimedia.org/wiki/File:Closed_Access_logo_transparent.svg Jakob Voss, based on art designer at PLoS, modified by Wikipedia users Nina and Beao
Israel Journal of Mathematics
Article . 1983 . Peer-reviewed
License: Springer TDM
Data sources: Crossref
image/svg+xml Jakob Voss, based on art designer at PLoS, modified by Wikipedia users Nina and Beao Closed Access logo, derived from PLoS Open Access logo. This version with transparent background. http://commons.wikimedia.org/wiki/File:Closed_Access_logo_transparent.svg Jakob Voss, based on art designer at PLoS, modified by Wikipedia users Nina and Beao
zbMATH Open
Article . 1983
Data sources: zbMATH Open
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The double centralizer theorem for division algebras

Authors: Armendariz, Efraim P.; Park, Jae Keol;

The double centralizer theorem for division algebras

Abstract

Die Autoren beweisen den folgenden Satz: Sei D ein Körper mit Zentrum F, \(T\in M_ n(D)\) algebraisch über F. Dann ist der Doppelzentralisator C(C(T)) von T in \(M_ n(D)\) gleich F[T]. Der Beweis geht wie im kommutativen Fall aus von dem Modul \({}_ RV\) über dem Hauptidealring \(R=D[X]\), wobei \({}_ DV\) ein Vektorraum der Dimension n ist und X wie die lineare Transformation T operiert. V ist direkte Summe unzerlegbarer zyklischer Moduln \(R/Rq_ i\). Aber die \(Rq_ i\) sind nur Linksideale. Trotzdem ist der Bikommutant von \({}_ RV\) gleich D[T]: Jedes \(q_ i\) ist ''bounded'', d.h. \(Ann.(R/q_ iR)=(q_ i^*)\neq 0.\) Nach \textit{N. Jacobson} [The Theory of Rings (1943; Zbl 0060.073), theorem 20, p.45], gilt \(R/(q_ i^*)\simeq(R/q_ iR)^{n_ i}.\) Mit \(m=\prod n_ i=n_ in_ i\!'\) ist \(V^ m=\oplus(R/q_ iR)^{n_ in_ i\!'}=\oplus(R/(q_ i^*))^{n_ i\!'}.\) Aber \(V^ m\) und V haben denselben Bikommutanten [\textit{Bourbaki}, Algèbre, Chap. 8, {\S} 1, No.3, Prop. 8].

Related Organizations
Keywords

double centralizer, division ring, Division rings and semisimple Artin rings, Divisibility, noncommutative UFDs, Endomorphism rings; matrix rings, principal ideal ring

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selected citations
These citations are derived from selected sources.
This is an alternative to the "Influence" indicator, which also reflects the overall/total impact of an article in the research community at large, based on the underlying citation network (diachronically).
BIP!Citations provided by BIP!
popularity
This indicator reflects the "current" impact/attention (the "hype") of an article in the research community at large, based on the underlying citation network.
BIP!Popularity provided by BIP!
influence
This indicator reflects the overall/total impact of an article in the research community at large, based on the underlying citation network (diachronically).
BIP!Influence provided by BIP!
impulse
This indicator reflects the initial momentum of an article directly after its publication, based on the underlying citation network.
BIP!Impulse provided by BIP!
1
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