Monoids, Embedding Functors and Quantum Groups
Abstract
We show that the left regular representation \pi_l of a discrete quantum group (A,\Delta) has the absorbing property and forms a monoid (\pi_l,\tilde{m},\tilde{\eta}) in the representation category Rep(A,\Delta). Next we show that an absorbing monoid in an abstract tensor *-category C gives rise to an embedding functor E:C->Vect_C, and we identify conditions on the monoid, satisfied by (\pi_l,\tilde{m},\tilde{\eta}), implying that E is *-preserving. As is well-known, from an embedding functor E: C->\mathrm{Hilb} the generalized Tannaka theorem produces a discrete quantum group (A,\Delta) such that C is equivalent to Rep_f(A,\Delta). Thus, for a C^*-tensor category C with conjugates and irreducible unit the following are equivalent: (1) C is equivalent to the representation category of a discrete quantum group (A,\Delta), (2) C admits an absorbing monoid, (3) there exists a *-preserving embedding functor E: C->\mathrm{Hilb}.
Keywords
Cite
@article{arxiv.math/0604065,
title = {Monoids, Embedding Functors and Quantum Groups},
author = {Michael Müger and Lars Tuset},
journal= {arXiv preprint arXiv:math/0604065},
year = {2019}
}
Comments
Final version, to appear in Int. Journ. Math. (Added some references and Subsection 1.2.) Latex2e, 21 pages