Associative algebras and the representation theory of grading-restricted vertex algebras

Abstract

We introduce an associative algebra A∞(V) using infinite matrices with entries in a grading-restricted vertex algebra V such that the associated graded space Gr(W)=n∈ NGrn(W) of a filtration of a lower-bounded generalized V-module W is an A∞(V)-module satisfying additional properties (called a graded A∞(V)-module). We prove that a lower-bounded generalized V-module W is irreducible or completely reducible if and only if the graded A∞(V)-module Gr(W) is irreducible or completely reducible, respectively. We also prove that the set of equivalence classes of the lower-bounded generalized V-modules are in bijection with the set of the equivalence classes of graded A∞(V)-modules. For N∈ N, there is a subalgebra AN(V) of A∞(V) such that the subspace GrN(W)=n=0NGrn(W) of Gr(W) is an AN(V)-module satisfying additional properties (called a graded AN(V)-module). We prove that AN(V) are finite dimensional when V is of positive energy (CFT type) and C2-cofinite. We prove that the set of the equivalence classes of lower-bounded generalized V-modules is in bijection with the set of the equivalence classes of graded AN(V)-modules. In the case that V is a M\"obius vertex algebra and the differences between the real parts of the lowest weights of the irreducible lower-bounded generalized V-modules are less than or equal to N∈ N, we prove that a lower-bounded generalized V-module W of finite length is irreducible or completely reducible if and only if the graded AN(V)-module GrN(W) is irreducible or completely reducible, respectively.