On Indecomposable Non-Simple N-graded Vertex Algebras

Abstract

In this paper, we study an impact of Leibniz algebras on the algebraic structure of N-graded vertex algebras. We provide easy ways to characterize indecomposable non-simple N-graded vertex algebras n=0∞V(n) such that V(0)≥ 2. Also, we examine the algebraic structure of N-graded vertex algebras V=n=0∞V(n) such that ~V(0)≥ 2 and V(1) is a (semi)simple Leibniz algebra that has sl2 as its Levi factor. We show that under suitable conditions this type of vertex algebra is indecomposable but not simple. Along the way we classify vertex algebroids associated with (semi)simple Leibniz algebras that have sl2 as their Levi factor.