Associative algebras and intertwining operators

Abstract

Let V be a vertex operator algebra and A∞(V) and AN(V) for N∈ N the associative algebras introduced by the author in [H5]. For a lower-bounded generalized V-module W, we give W a structure of graded A∞(V)-module and we introduce an A∞(V)-bimodule A∞(W) and an AN(V)-bimodule AN(W). We prove that the space of (logarithmic) intertwining operators of type W3W1W2 for lower-bounded generalized V-modules W1, W2 and W3 is isomorphic to the space A∞(V)(A∞(W1)A∞(V)W2, W3). Assuming that W2 and W3' are equivalent to certain universal lower-bounded generalized V-modules generated by their AN(V)-submodules consisting of elements of levels less than or equal to N∈ N, we also prove that the space of (logarithmic) intertwining operators of type W3W1W2 is isomorphic to the space of AN(V)(AN(W1)AN(V)N0(W2), N0(W3)).