Cyclic orbifolds of lattice vertex operator algebras having group like fusions

Abstract

Let L be an even (positive definite) lattice and g∈ O(L). In this article, we prove that the orbifold vertex operator algebra VLg has group-like fusion if and only if g acts trivially on the discriminant group D(L)=L*/L (or equivalently (1-g)L*<L). We also determine their fusion rings and the corresponding quadratic space structures when g is fixed point free on L. By applying our method to some coinvariant sublattices of the Leech lattice , we prove a conjecture proposed by G. H\"ohn. In addition, we also discuss a construction of certain holomorphic vertex operator algebras of central charge 24 using the the orbifold vertex operator algebra V_gg.