A new proof of the sl2 action on the triplet vertex algebra

Abstract

Let W(p) be the triplet vertex algebra of central charge cp=1-6(p-1)2p, p≥2. As a Virasoro module, we have W(p)=n=0 ∞(2n+1) L(cp, n2p+np-n). It was pointed out in am1 that W(p) admits an action of sl2. In this paper we give a combinatorics description of W(p), from which the action of sl2 follows quite directly. In the end of this paper we give similar descriptions of the invariant subalgebra W(p), these will be useful for the characterizations of the exceptional vertex operator algebras of central charge 1 in forthcoming papers. We also hope to extend the method of this paper to subalgebra of lattice vertex operator algebras of higher rank.