q-Virasoro algebra and affine Kac-Moody Lie algebras

Abstract

We establish a natural connection of the q-Virasoro algebra Dq introduced by Belov and Chaltikian with affine Kac-Moody Lie algebras. More specifically, for each abelian group S together with a one-to-one linear character , we define an infinite-dimensional Lie algebra DS which reduces to Dq when S=Z. Guided by the theory of equivariant quasi modules for vertex algebras, we introduce another Lie algebra gS with S as an automorphism group and we prove that DS is isomorphic to the S-covariant algebra of the affine Lie algebra gS. We then relate restricted DS-modules of level ∈ C to equivariant quasi modules for the vertex algebra VgS(,0) associated to gS with level . Furthermore, we show that if S is a finite abelian group of order 2l+1, DS is isomorphic to the affine Kac-Moody algebra of type B(1)l.