N=4 superconformal algebras and diagonal cosets

Abstract

Coset constructions of W-algebras have many applications, and were recently given for principal W-algebras of A, D, and E types by Arakawa together with the first and third authors. In this paper, we give coset constructions of the large and small N=4 superconformal algebras, which are the minimal W-algebras of d(2,1;a) and psl(2|2), respectively. From these realizations, one finds a remarkable connection between the large N=4 algebra and the diagonal coset Ck1, k2 = Com(Vk1+k2(sl2), Vk1(sl2) Vk2(sl2)), namely, as two-parameter vertex algebras, Ck1, k2 coincides with the coset of the large N=4 algebra by its affine subalgebra. We also show that at special points in the parameter space, the simple quotients of these cosets are isomorphic to various W-algebras. As a corollary, we give new examples of strongly rational principal W-algebras of type C at degenerate admissible levels.