A 3-orbifold theory of lattice vertex operator algebra and 3-orbifold constructions

Abstract

Let V be a simple VOA of CFT-type satisfying V' V and σ a finite automorphism of V. We prove that if all V-modules are completely reducible and a fixed point subVOA Vσ is C2-cofinite, then all Vσ-modules are completely reducible and every simple Vσ-module appears in some twisted or ordinary V-modules as a Vσ-submodule. We also prove that VLσ is C2-cofinite for any lattice VOA VL and σ∈ (VL) lifted from any triality automorphism of L. Using these results, we present two Z3-orbifold constructions as examples. One is the moonshine VOA V and the other is a new CFT No.32 in Schellekens' list.