Ribbon Hopf algebra

A ribbon Hopf algebra $(A,m,\Delta ,u,\varepsilon ,S,{\mathcal {R}},\nu )$ is a quasitriangular Hopf algebra which possess an invertible central element $\nu$ more commonly known as the ribbon element, such that the following conditions hold:

\nu ^{2}=uS(u),\;S(\nu )=\nu ,\;\varepsilon (\nu )=1

\Delta (\nu )=({\mathcal {R}}_{21}{\mathcal {R}}_{12})^{-1}(\nu \otimes \nu )

where $u=m(S\otimes {\text{id}})({\mathcal {R}}_{21})$ . Note that the element u exists for any quasitriangular Hopf algebra, and $uS(u)$ must always be central and satisfies $S(uS(u))=uS(u),\varepsilon (uS(u))=1,\Delta (uS(u))=({\mathcal {R}}_{21}{\mathcal {R}}_{12})^{-2}(uS(u)\otimes uS(u))$ , so that all that is required is that it have a central square root with the above properties.

Here

A

is a vector space

m

is the multiplication map

m:A\otimes A\rightarrow A

\Delta

is the co-product map

\Delta :A\rightarrow A\otimes A

u

is the unit operator

u:\mathbb {C} \rightarrow A

\varepsilon

is the co-unit operator

\varepsilon :A\rightarrow \mathbb {C}

S

is the antipode

S:A\rightarrow A

{\mathcal {R}}

is a universal R matrix

We assume that the underlying field $K$ is $\mathbb {C}$

References

Altschuler, D.; Coste, A. (1992). "Quasi-quantum groups, knots, three-manifolds and topological field theory". Commun. Math. Phys. 150: 83–107. arXiv:hep-th/9202047 . doi:10.1007/bf02096567.
Chari, V. C.; Pressley, A. (1994). A Guide to Quantum Groups. Cambridge University Press. ISBN 0-521-55884-0.
Drinfeld, Vladimir (1989). "Quasi-Hopf algebras". Leningrad Math J. 1: 1419–1457.
Majid, Shahn (1995). Foundations of Quantum Group Theory. Cambridge University Press.

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Ribbon Hopf algebra

See also

References