On the operator content of nilpotent orbifold models
Abstract
Let V be a simple vertex operator algebra and G be a finite nilpotent group of automorphisms of V. We prove the following in this paper: (1) There is a Galois correspondence between subgroups of G and the vertex operator subalgebras of V which contain VG given by the map H VH. (2) Assume that for every G∈ G there is unique simple g-twisted V-module M(g). Then there exists a Hochschild 3-cocycle α on the integral group Z[G] such that there is an equivalence of categories between VG-module category (whose objects are VG-submodules of direct sums of copies of g∈ GM(g), and whose morphisms are VG-module homomorphisms) and the module category for the twisted quantum double Dα(G) associated to α.$
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