Extensions of Lie algebras of differential operators

Abstract

The aim of this note is to introduce the notion of a D-Lie algebra and to prove some elementary properties of D-Lie algebras, the category of D-Lie algebras, the category of modules on a D-Lie algebra and extensions of D-Lie algebras. A D-Lie algebra is an A/k-Lie-Rinehart algebra equipped with an Ak A-module structure and a canonical central element D and a compatibility property between the k-Lie algebra structure and the Ak A-module structure. Several authors have studied non-abelian extensions of Lie algebras, super Lie algebras, Lie algebroids and holomorphic Lie algebroids and we give in this note an explicit constructions of all non-abelian extensions a D-Lie algebra L by an A-Lie algebra (W,[,]) where L is projective as left A-module and W is an Ak A-module with IW=0 for I the kernel of the multiplication map. As a corollary we get an explicit construction of all non-abelian extensions of an A/k-Lie-Rinehart algebra (L,α) by an A-Lie algebra (W,[,]) where L is projective as left A-module.