English

Orbifolds and minimal modular extensions

Quantum Algebra 2021-08-24 v2 Group Theory Representation Theory

Abstract

Let VV be a simple, rational, C2C_2-cofinite vertex operator algebra and GG a finite group acting faithfully on VV as automorphisms, which is simply called a rational vertex operator algebra with a GG-action. It is shown that the category EVG{\cal E}_{V^G} generated by the VGV^G-submodules of VV is a symmetric fusion category braided equivalent to the GG-module category E=Rep(G){\cal E}={\rm Rep}(G). If VV is holomorphic, then the VGV^G-module category CVG{\cal C}_{V^G} is a minimal modular extension of E,{\cal E}, and is equivalent to the Drinfeld center Z(VecGα){\cal Z}({\rm Vec}_G^{\alpha}) as modular tensor categories for some αH3(G,S1)\alpha\in H^3(G,S^1) with a canonical embedding of E{\cal E}. Moreover, the collection Mv(E){\cal M}_v({\cal E}) of equivalence classes of the minimal modular extensions CVG{\cal C}_{V^G} of E{\cal E} for holomorphic vertex operator algebras VV with a GG-action form a group, which is isomorphic to a subgroup of H3(G,S1).H^3(G,S^1). Furthermore, any pointed modular category Z(VecGα){\cal Z}({\rm Vec}_G^{\alpha}) is equivalent to CVLG{\cal C}_{V_L^G} for some positive definite even unimodular lattice L.L. In general, for any rational vertex operator algebra UU with a GG-action, CUG{\cal C}_{U^G} is a minimal modular extension of the braided fusion subcategory F{\cal F} generated by the UGU^G-submodules of UU-modules. Furthermore, the group Mv(E){\cal M}_v({\cal E}) acts freely on the set of equivalence classes Mv(F){\cal M}_v({\cal F}) of the minimal modular extensions CWG{\cal C}_{W^G} of F{\cal F} for any rational vertex operators algebra WW with a GG-action.

Keywords

Cite

@article{arxiv.2108.05225,
  title  = {Orbifolds and minimal modular extensions},
  author = {Chongying Dong and Siu-Hung Ng and Li Ren},
  journal= {arXiv preprint arXiv:2108.05225},
  year   = {2021}
}

Comments

43 pages, correct typos and add more details to the proof of Theorem 7.1

R2 v1 2026-06-24T05:01:53.162Z