A unified construction of vertex algebras from infinite-dimensional Lie algebras

Abstract

In this paper, we give a unified construction of vertex algebras arising from infinite-dimensional Lie algebras, including the affine Kac-Moody algebras, Virasoro algebras, Heisenberg algebras and their higher rank analogs, orbifolds and deformations. We define a notion of what we call quasi vertex Lie algebra to unify these Lie algebras. Starting from any (maximal) quasi vertex Lie algebra g, we construct a corresponding vertex Lie algebra g0, and establish a canonical isomorphism between the category of restricted g-modules and that of equivariant φ-coordinated quasi Vg0-modules, where Vg0 is the universal enveloping vertex algebra of g0. This unified all the previous constructions of vertex algebras from infinite-dimensional Lie algebras and shed light on the way to associate vertex algebras with Lie algebras.