Center of affine sl2|1 at the critical level
Abstract
In this article, we shall describe the center of the universal affine vertex superalgebra Vc( g) associated with g=sl2|1, gl2|1 at the critical level c and prove the conjecture of A. Molev and E. Ragoucy in this case. The center z(Vc(sl2|1)) turns out to be isomorphic to the large level limit → ∞ of a vertex subalgebra, called the parafermion vertex algebra K (sl2), of the affine vertex algebra V(sl2). The key ingredient of the proof is to understand the principal W-superalgebra Wc(sl2|1) at the critical level. It relates the center z(Vc(sl 2|1)) to V∞(sl2) via the Kazama-Suzuki duality while it has a surprising coincidence with Vc(gl1|1), whose center has been recently described. Moreover, the centers z(Vc(sl2|1)) and z(Wc(sl2|1)) are proven to coincide as a byproduct. A general conjecture is proposed which describes the center z(Vc(sln|m)) with n>m as a large level limit of ``the dual side'', i.e., the parafermion-type subalgebras of W-algebras W(sln, O[n-m,1m]) associated with hook-type partitions [n-m,1m], known also as vertex algebras at the corner.
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