Orbifolds and cosets of minimal W-algebras

Abstract

Let g be a simple, finite-dimensional Lie (super)algebra equipped with an embedding of s l2 inducing the minimal gradation on g. The corresponding minimal W-algebra Wk(g, e-θ) introduced by Kac and Wakimoto has strong generators in weights 1,2,3/2, and all operator product expansions are known explicitly. The weight one subspace generates an affine vertex (super)algebra Vk'(g) where g ⊂ g denotes the centralizer of s l2. Therefore Wk(g, e-θ) has an action of a connected Lie group G0 with Lie algebra g0, where g0 denotes the even part of g. We show that for any reductive subgroup G ⊂ G0, and for any reductive Lie algebra g' ⊂ g, the orbifold Ok = Wk(g, e-θ)G and the coset Ck = Com(V(g'),Wk(g, e-θ)) are strongly finitely generated for generic values of k. Here V(g') denotes the affine vertex algebra associated to g'. We find explicit minimal strong generating sets for Ck when g' = g and g is either s ln, sp2n, sl(2|n) for n≠ 2, psl(2|2), or osp(1|4). Finally, we conjecture some surprising coincidences among families of cosets Ck which are the simple quotients of Ck, and we prove several cases of our conjecture.