Duality of subregular W-algebras and principal W-superalgebras

Abstract

We prove Feigin-Frenkel type dualities between subregular W-algebras of type A, B and principal W-superalgebras of type sl(1|n), osp(2|2n). The type A case proves a conjecture of Feigin and Semikhatov. Let (g1,g2) = (sln+1,sl(1|n+1)) or (so2n+1, osp(2|2n)) and let r be the lacity of g1. Let k be a complex number and defined by r(k+h1)(+h2)=1 with hi the dual Coxeter numbers of the gi. Our first main result is that the Heisenberg cosets Ck( g1) and C( g2) of these W-algebras at these dual levels are isomorphic, i.e. Ck( g1) C( g2) for generic k. We determine the generic levels and furthermore establish analogous results for the cosets of the simple quotients of the W-algebras. Our second result is a novel Kazama-Suzuki type coset construction: We show that a diagonal Heisenberg coset of the subregular W-algebra at level k times the lattice vertex superalgebra V Z is the principal W-superalgebra at the dual level . Conversely a diagonal Heisenberg coset of the principal W-superalgebra at level times the lattice vertex superalgebra V-1 Z is the subregular W-algebra at the dual level k. Again this is proven for the universal W-algebras as well as for the simple quotients. We show that a consequence of the Kazama-Suzuki type construction is that the simple principal W-superalgebra and its Heisenberg coset at level are rational and/or C2-cofinite if the same is true for the simple subregular W-algebra at dual level . This gives many new C2-cofiniteness and rationality results.