Contributions to centralizers in matrix rings

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dc.contributor.advisorVan Wyk, L.
dc.contributor.authorMarais, Magdaleen Suzanne
dc.contributor.otherUniversity of Stellenbosch. Faculty of Science. Dept. of Mathematical Sciences.
dc.date.accessioned2010-11-19T14:12:32Z
dc.date.accessioned2010-12-15T10:16:00Z
dc.date.available2010-11-19T14:12:32Z
dc.date.available2010-12-15T10:16:00Z
dc.date.issued2010-12
dc.descriptionThesis (PhD (Mathematics))--University of Stellenbosch, 2010.
dc.description.abstractENGLISH ABSTRACT: THE concept of a k-matrix in the full 2 2 matrix ring M2(R=hki), where R is an arbitrary unique factorization domain (UFD) and k is an arbitrary nonzero nonunit in R, is introduced. We obtain a concrete description of the centralizer of a k-matrix bB in M2(R=hki) as the sum of two subrings S1 and S2 ofM2(R=hki), where S1 is the image (under the natural epimorphism fromM2(R) toM2(R=hki)) of the centralizer in M2(R) of a pre-image of bB, and where the entries in S2 are intersections of certain annihilators of elements arising from the entries of bB. Furthermore, necessary and sufficient conditions are given for when S1 S2, for when S2 S1 and for when S1 = S2. It turns out that if R is a principal ideal domain (PID), then every matrix in M2(R=hki) is a k-matrix for every k. However, this is not the case in general if R is a UFD. Moreover, for every factor ring R=hki with zero divisors and every n > 3 there is a matrix for which the mentioned concrete description is not valid. Finally we provide a formula for the number of elements of the centralizer of bB in case R is a UFD and R=hki is finite.en
dc.description.abstractAFRIKAANSE OPSOMMING: DIE konsep van ’n k-matriks in die volledige 2 2 matriksring M2(R=hki), waar R ’n willekeurige unieke faktoriseringsgebied (UFG) en k ’n willekeurige nie-nul nie-inverteerbare element in R is, word bekendgestel. Ons verkry ’n konkrete beskrywing van die sentraliseerder van ’n k-matriks bB in M2(R=hki) as die som van twee subringe S1 en S2 van M2(R=hki), waar S1 die beeld (onder die natuurlike epimorfisme van M2(R) na M2(R=hki)) van die sentraliseerder in M2(R) van ’n trubeeld vanbB is, en die inskrywings van S2 die deursnede van sekere annihileerders van elemente afkomstig van die inskrywings van bB is. Verder word nodige en voldoende voorwaardes gegee vir wanneer S1 S2, vir wanneer S2 S1 en vir wanneer S1 = S2. Dit blyk dat as R ’n hoofideaalgebied (HIG) is, dan is elke matriks in M2(R=hki) ’n k-matriks vir elke k. Dit is egter nie in die algemeen waar indien R ’n UFG is nie. Meer nog, vir elke faktorring R=hki met nuldelers en elke n > 3 is daar ’n matriks waarvoor die bogenoemde konkrete beskrywing nie geldig is nie. Laastens word ’n formule vir die aantal elemente van die sentraliseerder van bB verskaf, indien R ’n UFG en R=hki eindig is.af
dc.format.extent87 p.
dc.identifier.urihttp://hdl.handle.net/10019.1/5154
dc.language.isoen
dc.publisherStellenbosch : University of Stellenbosch
dc.rights.holderUniversity of Stellenbosch
dc.subjectCentralizers
dc.subjectMatrix rings
dc.subjectDissertations -- Mathematicsen
dc.subjectTheses -- Mathematicsen
dc.subjectMatricesen
dc.titleContributions to centralizers in matrix ringsen
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