Generalized Orbifold Construction for Conformal Nets
Abstract
Let 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 of , which generalizes the -orbifold. Conversely, we show that if is a finite inclusion of conformal nets, then is a generalized orbifold of the conformal net by a unique finite hypergroup . There is a Galois correspondence between intermediate nets and subhypergroups given by . In this case, the fixed point of is the generalized orbifold by the hypergroup of double cosets . If is an finite index inclusion of completely rational nets, we show that the inclusion is conjugate to a Longo--Rehren inclusion. This implies that if is a holomorphic net, and acts properly on , then there is a unitary fusion category which is a categorification of and is braided equivalent to the Drinfel'd center . More generally, if is completely rational conformal net and acts properly on , then there is a unitary fusion category extending , such that is given by the double cosets of the fusion ring of by the Verlinde fusion ring of and is braided equivalent to the M\"uger centralizer of in .
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