Ribbon category
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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
- defn
A ribbon category is a rigid braided tensor category with functorial isomorphisms \(\delta_V : V \simeq V^{**}\) satisfying \[ \begin{aligned} \delta_{V\otimes W} & = \delta_V\otimes \delta_W, \\ \delta_{1} & = \operatorname{id}, \\ \delta_{V^{*}} & = (\delta_V^{*})^{-1} \end{aligned} \] where for \(f\in \operatorname{Hom}(U,V)\), \(f^*\in \operatorname{Hom}(V^*,U^*)\)
example
category of finite-dimensional representations of the quantum group
- Bakalov-Kirillov p.34
- let \(\mathfrak{g}\) be a simple Lie algebra
- 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 \(\delta_V = q^{2\rho} :V \simeq V^{**}\)
- 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 \(V^{**}\simeq V\) as a vector space, but has a different action of \(U_q(\mathfrak{g})\), namely
\[ \pi_{V^{**}}(a) = \pi_{V}(\gamma^2(a))), \, a\in U_q(\mathfrak{g}) \]
- we have \(\gamma^2(a) = q^{2\rho}a q^{-2\rho},\, a\in U_q(\mathfrak{g})\)
Drinfeld category
메타데이터
위키데이터
- ID : Q17102717
Spacy 패턴 목록
- [{'LOWER': 'ribbon'}, {'LEMMA': 'category'}]
- [{'LOWER': 'tortile'}, {'LEMMA': 'category'}]