"Ribbon category"의 두 판 사이의 차이
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imported>Pythagoras0 (새 문서: ==introduction== * important class of braided monoidal categories * two additional structures ** duality ** twist * construction of isotopy invariants of knots, links, tangles, whose ...) |
imported>Pythagoras0 |
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| 7번째 줄: | 7번째 줄: | ||
| + | ==example== | ||
| + | * Bakalov-Kirillov p.34 | ||
| + | * non-trivial example of a ribbon category is provided by the category of finite-dimensional representations of the quantum group $U_q(\mathfrak{g})$ | ||
| + | * balancing $\delta_V = q^{2\rho} :V \to V^{**}$ | ||
| + | * on a weight vector $v$ of weight $\lambda$, $q^{2\rho}$ acts as a multiplication by $q^{\langle \langle 2\rho, \lambda \rangle \rangle}$ | ||
| + | * we see that $V^{**}\equiv V$ as a vector space, but has a different action of $U_q(\mathfrak{g})$, namely | ||
| + | $$ | ||
| + | \pi_{V^{**}}(a) = \pi_{V}(\gamma^2(a))), \, a\in U_q(\mathfrak{g}) | ||
| + | $$ | ||
| + | * $\gamma^2(a) = q^{2\rho}a q^{-2\rho}$ | ||
[[분류:quantum groups]] | [[분류:quantum groups]] | ||
2016년 12월 13일 (화) 22:51 판
introduction
- important class of braided monoidal categories
- two additional structures
- duality
- twist
- construction of isotopy invariants of knots, links, tangles, whose components are coloured with objects of a ribbon category
example
- Bakalov-Kirillov p.34
- non-trivial example of a ribbon category is provided by the category of finite-dimensional representations of the quantum group $U_q(\mathfrak{g})$
- balancing $\delta_V = q^{2\rho} :V \to V^{**}$
- on a weight vector $v$ of weight $\lambda$, $q^{2\rho}$ acts as a multiplication by $q^{\langle \langle 2\rho, \lambda \rangle \rangle}$
- we see that $V^{**}\equiv V$ as a vector space, but has a different action of $U_q(\mathfrak{g})$, namely
$$ \pi_{V^{**}}(a) = \pi_{V}(\gamma^2(a))), \, a\in U_q(\mathfrak{g}) $$
- $\gamma^2(a) = q^{2\rho}a q^{-2\rho}$