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The Global ETD Search service is a free service for researchers
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Showing 11 to 13 of 13 (0.036 seconds)Spelling suggestions: "subject:"nonabelian group"" "subject:"anabelian group""
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Calculating the Mass of Magnetic Monopoles in Non-Abelian Gauge TheoriesHolmberg, Måns January 2016 (has links)
No description available.
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Códigos de peso constante / One weight codesRuth Nascimento 09 June 2014 (has links)
Sejam F_q um corpo finito com q elementos, e C_n um grupo cíclico de n elementos com mdc(q,n) = 1. Iniciamos nosso trabalho inspirados nos resultados de Vega, estabelecendo condições para que um código de F_qC_n tenha peso constante. Com tal resultado concluímos que um código de peso constante em F_qC_n é da forma {rg^ie | r em F_q, i variando de 0 a n}. A partir disto, determinamos a quantidade de códigos de peso constante de F_qC_n, e construímos exemplos de códigos de dois pesos em F_q(C_n X C_n). Em seguida, estabelecemos sob quais condições um código em F_qA, para A um grupo abeliano finito, tem peso constante. Analisamos também os códigos de peso constante em RG, quando R um anel de cadeia finito e C_n é um grupo cíclico de n elementos com mdc(n,q) = 1. Além disso, analisamos o caso em que os elementos de um ideal de RA, para R um domínio de integridade infinito e A um grupo abeliano finito têm peso constante. / Let F_q be a field with q elements, C_n be a cyclic group of order n and suppose that gcd(q,n) = 1. In this work conditions are given to ensure that a code in F_qC_n is a one weight code, inspired in the work of Vega. As a consequence of this result we showed that a one weight code in F_qC_n is of the form {rg^ie | r in F_q, i between 0 and n}. With this, we determined the number of one weight codes in F_qC_n, and constructed examples of two weight codes in F_q(C_n X C_n). After this, we gave conditions to ensure that a code had constant weight in F_qA, for A a finite abelian group. We also analyzed the one weight codes in RG, R a chain ring and C_n a cyclic group with n elements with gcd(n,q) = 1. Moreover, we analyzed the case when the elements of an ideal in RA, for R an infinite integral domain and A a finite abelian group, have constant weight.
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Das Oka-Grauert-Prinzip für Kozyklen mit Werten in Bündeln von nicht-abelschen GruppenPlatt, Karl Florian Erich 13 January 2014 (has links)
Ein bedeutender Satz von L. Bungart und H. Grauert besagt, dass, für eine Gruppe G von invertierbaren Elementen einer Banachalgebra, je zwei G-wertige holomorphe Kozyklen über einer beliebigen Steinschen Mannigfaltigkeit holomorph äquivalent sind, wenn sie dort stetig äquivalent sind. Eine einfachere Form dieses Satzes wurde erstmals von K. Oka bewiesen. Aussagen dieser Art werden deshalb auch Okasche Prinzipe oder Oka-Grauert-Prinzipe genannt. Der Bungert-Grauert-Satz ist auch in dem Fall von Bedeutung, in dem die Steinsche Mannigfaltigkeit ein Gebiet in der komplexen Ebene ist. Man kann deshalb in der Literatur auch direkte Beweise für den Spezialfall finden, in dem ein G-wertiger holomorpher, stetig trivialer Kozyklus betrachtet wird. Dieser ist, nach dem oben erwähnten Satz, dann auch holomorph trivial. Ziel dieser Dissertation ist es, den Bungart-Grauert-Satz für Gebiete in der komplexen Ebene auch im allgemeinen Fall direkt zu beweisen. Dieser direkte Beweis ist wesentlich einfacher als der bisherige und muss nicht, wie bei L. Bungart und H. Grauert, auf eine Theorie von mehreren Veränderlichen zurückgreifen. Wie in den Arbeiten von L. Bungart und H. Grauert gezeigt, kann dies durch das sogenannte Verdrillen, einer Methode aus einer allgemeinen Theorie von holomorphen Kozyklen mit Werten in Bündeln von Gruppen, erzielt werden. Der größte Teil der Dissertation besteht deshalb darin, eine solche Theorie im Fall von Gebieten in der komplexen Ebene direkt aufzubauen. / An important theorem of L. Bungart and H. Grauert says that for the group G of invertible elements of a banachalgebra, two holomorphic, G-valued cocycles over a Stein manifold, which are continiously equivalent, are holomorphically equivalent there. A simpler form of that theorem was first proven by K. Oka. That''s why theorems like this are known as Oka-Grauert-priciples as well. The Bungart-Grauert theorem is also significant if the Stein manifold is a domain in the complex plane. That''s why direct proofs of the special case, in which a continiously trivial, holomorphic cocycle is considered, can also be found in literature. Following the Bungart-Grauert theorem mentioned above, such a cocycle is also holomorphically trivial. The goal of this thesis is to prove the general case of the Bungart-Grauert theorem for a domain in the complex plane directly. That direct proof is much more simple than the old one. Furthermore this direct proof doesn''t have to resort to a theory of multiple variables, unlike the proof from L. Bungart and H. Grauert does. As shown in the original works, such a proof can be archieved by using the so called twisting. Twisting is a method from a theory of holomorphic cocycles with values in bundles of groups. In the main part of this thesis such a theory is build directly for domains in the complex plane.
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