"Non UBC"@en .
"DSpace"@en .
"Wenzl, Hans"@en .
"2019-03-25T02:02:19Z"@en .
"2018-09-25T16:48"@en .
"By definition, the endomorphism spaces of tensor powers\nof objects of a braided tensor category carries a representation\nof the braid group. For Lie types A and C, this can be used\nto classify all braided tensor categories whose fusion ring\nis the one of the representation category of the related Lie algebra.\nWe also discuss the situation for other classical Lie types\nand some exceptional types.\n\nThere are several different ways how to construct TQFTs and\nmodular functors. One of the motivations for these categorical\nquestions was to decide when these constructions yield\nthe same results."@en .
"https://circle.library.ubc.ca/rest/handle/2429/69175?expand=metadata"@en .
"45.0"@en .
"video/mp4"@en .
""@en .
"Author affiliation: University of California, San Diego"@en .
"Oaxaca (Mexico : State)"@en .
"10.14288/1.0377417"@en .
"eng"@en .
"Unreviewed"@en .
"Vancouver : University of British Columbia Library"@en .
"Banff International Research Station for Mathematical Innovation and Discovery"@en .
"Attribution-NonCommercial-NoDerivatives 4.0 International"@en .
"http://creativecommons.org/licenses/by-nc-nd/4.0/"@en .
"Faculty"@en .
"BIRS Workshop Lecture Videos (Oaxaca (Mexico : State))"@en .
"Mathematics"@en .
"Algebraic geometry"@en .
"Quantum theory"@en .
"Mathematical physics"@en .
"Classification of certain braided tensor categories"@en .
"Moving Image"@en .
"http://hdl.handle.net/2429/69175"@en .