Schur-Weyl Duality for Heisenberg Cosets

Abstract

Let V be a simple vertex operator algebra containing a rank n Heisenberg vertex algebra H and let C=Com( H, V) be the coset of H in V. Assuming that the representation categories of interest are vertex tensor categories in the sense of Huang, Lepowsky and Zhang, a Schur-Weyl type duality for both simple and indecomposable but reducible modules is proven. Families of vertex algebra extensions of C are found and every simple C-module is shown to be contained in at least one V-module. A corollary of this is that if V is rational and C2-cofinite and CFT-type, and Com( C, V) is a rational lattice vertex operator algebra, then so is C. These results are illustrated with many examples and the C1-cofiniteness of certain interesting classes of modules is established.