比利时vs摩洛哥足彩
,
university of california san diego
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final defense
daniel copeland
ucsd
classification of ribbon categories with the fusion rules of $so(n)$
abstract:
in this talk we discuss a classification of ribbon categories with the tensor product rules of the finite-dimensional complex representations of $so(n)$, for $n \geq 5$ and $n=3$. the equivalence class of a category with $so(n)$ fusion rules depends only on the eigenvalues of the braid operator on $x \otimes x$, where $x$ corresponds to the defining representation. the classification applies both to generic $so(n)$ tensor product rules, and to certain fusion rings having only finitely many simple objects.
advisor: hans wenzl
june 8, 2020
3:00 pm
zoom (email drcopela@ucsd.edu for link)
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