Bimodule and twisted representation of vertex operator algebras

Abstract

In this paper, for a vertex operator algebra V with an automorphism g of order T, an admissible V-module M and a fixed nonnegative rational number n∈1TZ+, we construct an Ag,n(V)-bimodule g,n(M) and study its some properties, discuss the connections between bimodule g,n(M) and intertwining operators. Especially, bimodule g,n-1T(M) is a natural quotient of g,n(M) and there is a linear isomorphism between the space IM\,MjMk of intertwining operators and the space of homomorphisms HomAg,n(V)(g,n(M)Ag,n(V)Mj(s), Mk(t)) for s,t≤ n, Mj, Mk are g-twisted V modules, if V is g-rational.