Screening operators for W-algebras

Abstract

Let g be a simple finite-dimensional Lie superalgebra with a non-degenerate supersymmetric even invariant bilinear form, f a nilpotent element in the even part of g, a good grading of g for f and Wk(g,f;) the W-algebra associated with g,f,k, defined by the generalized Drinfeld-Sokolov reduction. In this paper, we present each W-algebra as the intersection of kernels of the screening operators, acting on the tensor vertex superalgebra of an affine vertex superalgebra and a neutral free superfermion vertex superalgebra. As applications, we prove that the W-algebra associated with a regular nilpotent element in osp(1,2n) is isomorphic to the WBn-algebra introduced by Fateev and Lukyanov, and that the W-algebra associated with a subregular nilpotent element in sln is isomorphic to the W(2)n-algebra introduced by Feigin and Semikhatov.