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Generalized Orbifold Construction for Conformal Nets

Mathematical Physics 2017-02-01 v1 High Energy Physics - Theory math.MP Operator Algebras Quantum Algebra Representation Theory

Abstract

Let B\mathcal{B} be a conformal net. We give the notion of a proper action of a finite hypergroup acting by vacuum preserving unital completely positive (so-called stochastic) maps, which generalizes the proper actions of finite groups. Taking fixed points under such an action gives a finite index subnet BK\mathcal{B}^K of B\mathcal{B}, which generalizes the GG-orbifold. Conversely, we show that if AB\mathcal{A}\subset \mathcal{B} is a finite inclusion of conformal nets, then A\mathcal{A} is a generalized orbifold A=BK\mathcal{A}=\mathcal{B}^K of the conformal net B\mathcal{B} by a unique finite hypergroup KK. There is a Galois correspondence between intermediate nets BKAB\mathcal{B}^K\subset \mathcal{A} \subset \mathcal{B} and subhypergroups LKL\subset K given by A=BL\mathcal{A}=\mathcal{B}^L. In this case, the fixed point of BKA\mathcal{B}^K\subset \mathcal{A} is the generalized orbifold by the hypergroup of double cosets L\K/LL\backslash K/ L. If AB\mathcal{A}\subset \mathcal{B} is an finite index inclusion of completely rational nets, we show that the inclusion A(I)B(I)\mathcal{A}(I)\subset \mathcal{B}(I) is conjugate to a Longo--Rehren inclusion. This implies that if B\mathcal{B} is a holomorphic net, and KK acts properly on B\mathcal{B}, then there is a unitary fusion category F\mathcal{F} which is a categorification of KK and Rep(BK)\mathrm{Rep}(\mathcal{B}^K) is braided equivalent to the Drinfel'd center Z(F)Z(\mathcal{F}). More generally, if B\mathcal{B} is completely rational conformal net and KK acts properly on B\mathcal{B}, then there is a unitary fusion category F\mathcal{F} extending Rep(B)\mathrm{Rep}(\mathcal{B}), such that KK is given by the double cosets of the fusion ring of F\mathcal{F} by the Verlinde fusion ring of B\mathcal{B} and Rep(BK)\mathrm{Rep}(\mathcal{B}^K) is braided equivalent to the M\"uger centralizer of Rep(B)\mathrm{Rep}(\mathcal{B}) in Z(F)Z(\mathcal{F}).

Keywords

Cite

@article{arxiv.1608.00253,
  title  = {Generalized Orbifold Construction for Conformal Nets},
  author = {Marcel Bischoff},
  journal= {arXiv preprint arXiv:1608.00253},
  year   = {2017}
}

Comments

40 pages, many TikZ figures. Comments are welcome

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