Ito's conjecture and the coset construction for Wk(sl(3|2))

Abstract

Many W-(super)algebras which are defined by the generalized Drinfeld-Sokolov reduction are also known or expected to have coset realizations. For example, it was conjectured by Ito that the principal W-superalgebra Wk(sl(n+1|n)) is isomorphic to the coset of Vl+1(gln) inside Vl(sln+1) E(n) for generic values of l. Here E(n) denotes the rank n bc-system, which carries an action of V1(gln), and k and l are related by (k + 1) (l + n + 1) = 1. This conjecture is known in the case n=1, which is somewhat degenerate, and we shall prove it in the first nontrivial case n=2. As a consequence, we show that the simple quotient Wk(sl(3|2)) is lisse and rational for all positive integers l>1. These are new examples of rational W-superalgebras.