Finiteness and Construction of Internal Hom for Vertex Operator Algebras

Abstract

Let V be a vertex operator algebra, and let W1 and W2 be restricted V-modules. We construct a generalized V-module H(W1, W2) characterized by canonical universal properties. We show that, under suitable hypotheses, H(W1, W2) realizes the internal Hom object in the tensor category of restricted V-modules. Although our construction differs from Li's, we show that it agrees with the natural logarithmic generalization of Li's module Δ(W1, W2). We further establish a canonical isomorphism between H (W1,(W2 ) ) and the P(z0)-dual product W1 P(z0) W2 recently constructed by Du and Huang. Under the C1-cofiniteness condition, we investigate finiteness properties of H(W1, W2). As applications, we obtain a natural isomorphism between H(W1, W2)' and W1 (W2)', and prove the finiteness of the corresponding fusion rules.