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Symplectic level-rank duality via tensor categories

We give two proofs of a level-rank duality for braided fusion categories obtained from quantum groups of type $C$ at roots of unity. The first proof uses conformal embeddings, while the second uses a classification of braided fusion categories associated with quantum groups of type $C$ at roots of unity. In addition we give a similar result for non-unitary braided fusion categories quantum groups of types $B$ and $C$ at odd roots of unity.

preprint2020arXivOpen access

Victor Ostrik Eric C. Rowell Michael Sun

math.RT math.QA

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Victor Ostrik Eric C. Rowell Michael Sun

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