Extending structures for Lie algebras

Abstract

Let g be a Lie algebra, E a vector space containing g as a subspace. The paper is devoted to the extending structures problem which asks for the classification of all Lie algebra structures on E such that g is a Lie subalgebra of E. A general product, called the unified product, is introduced as a tool for our approach. Let V be a complement of g in E: the unified product g \, \, V is associated to a system (, \, , \, f, \-, \, -\) consisting of two actions and , a generalized cocycle f and a twisted Jacobi bracket \-, \, -\ on V. There exists a Lie algebra structure [-,-] on E containing g as a Lie subalgebra if and only if there exists an isomorphism of Lie algebras (E, [-,-]) g \, \, V. All such Lie algebra structures on E are classified by two cohomological type objects which are explicitly constructed. The first one H2g (V, g) will classify all Lie algebra structures on E up to an isomorphism that stabilizes g while the second object H2 (V, g) provides the classification from the view point ofthe extension problem. Several examples that compute both classifying objects H2g (V, g) and H2 (V, g) are worked out in detail in the case of flag extending structures.