Vertex algebras related to regular representations of SL2
Abstract
We construct a family of potentially quasi-lisse (non-rational) vertex algebras, denoted by Cp, p ≥ 2, which are closely related to the vertex algebra of chiral differential operators on SL(2) at level -2+1p. We prove that for p = 3, there is an isomorphism between C3 and the affine vertex algebra L-5/3(g2) from Deligne's series. Moreover, we also establish isomorphisms between C4 and C5 and certain affine W-algebras of types F4 and E8, respectively. In this way, we resolve the problem of decomposing certain conformal embeddings of affine vertex algebras into affine W-algebras. An important feature is that Cp is 12 Z≥ 0-graded with finite-dimensional graded subspaces and convergent characters. Therefore, for all p ≥ 2, we show that the characters of Cp exhibit modularity, supporting the conjectural quasi-lisse property.
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