Regularity of fixed-point vertex operator subalgebras

Abstract

We show that if T is a simple non-negatively graded regular vertex operator algebra with a nonsingular invariant bilinear form and σ is a finite order automorphism of T, then the fixed-point vertex operator subalgebra Tσ is also regular. This yields regularity for fixed point vertex operator subalgebras under the action of any finite solvable group. As an application, we obtain an SL2(Z)-compatibility between twisted twining characters for commuting finite order automorphisms of holomorphic vertex operator algebras. This resolves one of the principal claims in the Generalized Moonshine conjecture.