Twisted associative algebras and intertwining operators
Abstract
For a vertex algebra V with a finite-order automorphism g satisfying gT = 1 for some T ∈ N, we construct an associative algebra Ag,∞(V) and prove that the category of 1TN-graded g-twisted ϕ-coordinated V-modules is isomorphic to the category of graded Ag,∞(V)-modules. Furthermore, when V is a vertex operator algebra, we construct associative algebras Ag,∞(V) and Ag,∞(V), and establish that the categories of admissible g-twisted V-modules and ordinary g-twisted V-modules are isomorphic to the categories of graded Ag,∞(V)-modules and graded Ag,∞(V)-modules, respectively. By proving that Ag,∞(V) is isomorphic to Ag,∞(V), we obtain the equivalence between the category of 1TN-graded g-twisted ϕ-coordinated V-modules and the category of admissible g-twisted V-modules. Let g1, g2, g3 be three commuting automorphisms of V of finite order such that g1 g2 = g3 and giT = 1 for i = 1, 2, 3 and some T ∈ N. Suppose that Wi is a gi-twisted V-module for each i = 1, 2, 3. We then construct an Ag3,∞(V)-Ag2,∞(V)-bimodule Ag3,g2,∞(W1), and prove that the space of intertwining operators of type W3W1 \; W2 is isomorphic to HomAg3,∞(V)\!( Ag3,g2,∞(W1) Ag2,∞(V) W2, \, W3 ).
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