Regular representations and Huang-Lepowsky's tensor functors for vertex operator algebras

Abstract

This is the second paper in a series to study regular representations for vertex operator algebras. In this paper, given a module W for a vertex operator algebra V, we construct, out of the dual space W*, a family of canonical (weak) V V-modules called DQ(z)(W) parametrized by a nonzero complex number z. We prove that for V-modules W,W1 and W2, a Q(z)-intertwining map of type W' W1W2 in the sense of Huang and Lepowsky exactly amounts to a V V-homomorphism from W1 W2 to DQ(z)(W) and that a Q(z)-tensor product of V-modules W1 and W2 in the sense of Huang and Lepowsky amounts to a universal from W1 W2 to the functor FQ(z), where FQ(z) is a functor from the category of V-modules to the category of weak V V-modules defined by FQ(z)(W)=DQ(z)(W') for a V-module W. Furthermore, Huang-Lepowsky's P(z) and Q(z)-tensor functors for the category of V-modules are extended to functors TP(z) and TQ(z) from the category of V V-modules to the category of V-modules. It is proved that functors FP(z) and FQ(z) are right adjoints of TP(z) and TQ(z), respectively.

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