The structure of the Kac-Wang-Yan algebra

Abstract

The Lie algebra D of regular differential operators on the circle has a universal central extension D. The invariant subalgebra D+ under an involution preserving the principal gradation was introduced by Kac, Wang, and Yan. The vacuum D+-module with central charge c∈C, and its irreducible quotient Vc, possess vertex algebra structures, and Vc has a nontrivial structure if and only if c∈ 12Z. We show that for each integer n>0, Vn/2 and V-n are W-algebras of types W(2,4,…,2n) and W(2,4,…, 2n2+4n), respectively. These results are formal consequences of Weyl's first and second fundamental theorems of invariant theory for the orthogonal group O(n) and the symplectic group Sp(2n), respectively. Based on Sergeev's theorems on the invariant theory of Osp(1,2n) we conjecture that V-n + 1/2 is of type W(2,4,…, 4n2+8n+2), and we prove this for n=1. As an application, we show that invariant subalgebras of βγ-systems and free fermion algebras under arbitrary reductive group actions are strongly finitely generated.