Fourvolutions and automorphism groups of orbifold lattice vertex operator algebras

Abstract

Let L be an even positive definite lattice with no roots, i.e., L(2)=\x∈ L (x|x)=2\=. Let g∈ O(L) be an isometry of order 4 such that g2=-1 on L. In this article, we determine the full automorphism group of the orbifold vertex operator algebra VLg. As our main result, we show that Aut(VLg) is isomorphic to NAut(VL)( g)/ g unless L 2E8 or BW16.