Feigin-Semikhatov duality at the critical level
Abstract
The Feigin-Semikhatov duality asserts that the Heisenberg cosets of the subregular W-algebra of sln at level k and the one of the principal W-superalgebra of sln|1 at level coincide when the levels satisfy the Feigin-Frenkel relation (k+n)(+n-1)=1. A similar duality holds between the subregular W-algebra of so2n+1 and the principal W-superalgebra of osp2|2n. We study these dualities in the critical/large level limit. We describe the centerless subregular W-algebra at the critical level as an orbifold of the large level limit of the principal W-superalgebra times a lattice VOA. Our construction yields a functor between certain categories of the two involved vertex algebras. We show that in this set-up one in fact gets block-wise equivalences of categories. Studying the principal block of the large level limit of the principal W-superalgebra then gives us the structure of the principal blocks of the subregular W-algebras in the category of weight modules (which is much larger than the more common category of lower bounded modules).
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