Regular representations of vertex operator algebras, I

Abstract

In this paper, given a module W for a vertex operator algebra V and a nonzero complex number z we construct a canonical (weak) V V-module DP(z)(W) (a subspace of W* depending on z). We prove that for V-modules W, W1 and W2, a P(z)-intertwining map of type W' W1W2 ([H3], [HL0-3]) exactly amounts to a V V-homomorphism from W1 W2 into DP(z)(W). Using Huang and Lepowsky's one-to-one linear correspondence between the space of intertwining operators and the space of P(z)-intertwining maps of the same type we obtain a canonical linear isomorphism from the space VW'W1W2 of intertwining operators of the indicated type to V V(W1 W2,DP(z)(W)). In the case that W=V, we obtain a decomposition of Peter-Weyl type for DP(z)(V), which are what we call the regular representations of V.

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