A remark on Zp-orbifold constructions of the Moonshine vertex operator algebra

Abstract

For p = 3,5,7,13, we consider a Zp-orbifold construction of the Moonshine vertex operator algebra V. We show that the vertex operator algebra obtained by the Zp-orbifold construction on the Leech lattice vertex operator algebra V and a lift of a fixed-point-free isometry of order p is isomorphic to the Moonshine vertex operator algebra V. We also describe the relationship between those Zp-orbifold constructions and the Z2-orbifold construction in a uniform manner. In Appendix, we give a characterization of the Moonshine vertex operator algebra V by two mutually orthogonal Ising vectors.