Boundary minimal models and the Rogers-Ramanujan identities

Abstract

We determine when the irreducible modules L(cp, q, hm, n) over the simple Virasoro vertex algebras Virp, q, where p, q 2 are relatively prime with 0 < m < p and 0 < n < q, are classically free. It turns out that this only happens with the boundary minimal models, i.e., with the irreducible modules over Vir2, 2s + 1 for s ∈ Z+. We thus obtain a complete description of the classical limits of these modules in terms of the jet algebra of the corresponding Zhu C2-algebra. The Andrews-Gordon generalization of the Rogers-Ramanujan identities is used in the proof, and our results in turn provide a natural interpretation of these identities.

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