Representation Theory of Lie Colour Algebras and Its Connection with the Brauer Algebras

dc.contributor.author	Cao, Mengyuan
dc.contributor.supervisor	Nevins, Monica
dc.contributor.supervisor	Salmasian, Hadi
dc.date.accessioned	2018-09-17T17:36:52Z
dc.date.available	2018-09-17T17:36:52Z
dc.date.issued	2018-09-17	en_US
dc.description.abstract	In this thesis, we study the representation theory of Lie colour algebras. Our strategy follows the work of G. Benkart, C. L. Shader and A. Ram in 1998, which is to use the Brauer algebras which appear as the commutant of the orthosymplectic Lie colour algebra when they act on a k-fold tensor product of the standard representation. We give a general combinatorial construction of highest weight vectors using tableaux, and compute characters of the irreducible summands in some borderline cases. Along the way, we prove the RSK-correspondence for tableaux and the PBW theorem for Lie colour algebras.	en_US
dc.identifier.uri	http://hdl.handle.net/10393/38125
dc.identifier.uri	http://dx.doi.org/10.20381/ruor-22380
dc.language.iso	en	en_US
dc.publisher	Université d'Ottawa / University of Ottawa	en_US
dc.subject	Lie colour algebras	en_US
dc.subject	Brauer algebra	en_US
dc.subject	Representation theory	en_US
dc.subject	Tensor product	en_US
dc.title	Representation Theory of Lie Colour Algebras and Its Connection with the Brauer Algebras	en_US
dc.type	Thesis	en_US
thesis.degree.discipline	Sciences / Science	en_US
thesis.degree.level	Masters	en_US
thesis.degree.name	MSc	en_US
uottawa.department	Mathématiques et statistique / Mathematics and Statistics	en_US

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