Twisted regular representations of vertex operator algebras

Abstract

This paper is to study what we call twisted regular representations for vertex operator algebras. Let V be a vertex operator algebra, let σ1,σ2 be commuting finite-order automorphisms of V and let σ=(σ1σ2)-1. Among the main results, for any σ-twisted V-module W and any nonzero complex number z, we construct a weak σ1 σ2-twisted V V-module Dσ1,σ2(z)(W) inside W*. Let W1,W2 be σ1-twisted, σ2-twisted V-modules, respectively. We show that P(z)-intertwining maps from W1 W2 to W* are the same as homomorphisms of weak σ1 σ2-twisted V V-modules from W1 W2 into Dσ1,σ2(z)(W). We also show that a P(z)-intertwining map from W1 W2 to W* is equivalent to an intertwining operator of type W'W1\; W2, which is a twisted version of a result of Huang and Lepowsky. Finally, we show that for each τ-twisted V-module M with τ any finite-order automorphism of V, the coefficients of the q-graded trace function lie in Dτ,τ-1(-1)(V), which generate a τ τ-1-twisted V V-submodule isomorphic to M M'.