Invariant subalgebras of the small N=4 superconformal algebra

Abstract

Various aspects of orbifolds and cosets of the small N=4 superconformal algebra are studied. First, we determine minimal strong generators for generic and specific levels. As a corollary, we obtain the vertex algebra of global sections of the chiral de Rham complex on any complex Enriques surface. We also identify orbifolds of cosets of the small N=4 superconformal algebra with Com(V(sl2), V+1(sl2) W-5/2(sl4, frect)) and in addition at special levels with Grassmanian cosets and principal W-algebras of type A at degenerate admissible levels. These coincidences lead us to a novel level-rank duality involving Grassmannian supercosets.