Eigenvalues of rotations and braids in spherical fusion categories
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About this item
| Description: |
Tucker, H (University of California, San Diego)
Friday 27th January 2017 - 14:30 to 15:30 |
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| Created: | 2017-02-09 12:18 |
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| Collection: | Operator algebras: subfactors and their applications |
| Publisher: | Isaac Newton Institute |
| Copyright: | Tucker, H |
| Language: | eng (English) |
| Distribution: |
World
(downloadable)
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| Explicit content: | No |
| Aspect Ratio: | 16:9 |
| Screencast: | No |
| Bumper: | UCS Default |
| Trailer: | UCS Default |
| Abstract: | Co-authors: Daniel Barter (University of Michigan), Corey Jones (Australian National University)
Using the generalized categorical Frobenius-Schur indicators for semisimple spherical categories we have established formulas for the multiplicities of eigenvalues of generalized rotation operators. In particular, this implies for a finite depth planar algebra, the entire collection of rotation eigenvalues can be computed from the fusion rules and the traces of rotation at finitely many depths. If the category is also braided these formulas yield the multiplicities of eigenvalues for a large class of braids in the associated braid group representations. This provides the eigenvalue multiplicities for braids in terms of just the S and T matrices in the case where the category is modular. Related Links https://arxiv.org/abs/1611.00071 - arXiv:1611.00071 |
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