English

Extending structures for Lie algebras

Rings and Algebras 2014-07-01 v2 Mathematical Physics Differential Geometry math.MP

Abstract

Let g\mathfrak{g} be a Lie algebra, EE a vector space containing g\mathfrak{g} as a subspace. The paper is devoted to the \emph{extending structures problem} which asks for the classification of all Lie algebra structures on EE such that g\mathfrak{g} is a Lie subalgebra of EE. A general product, called the unified product, is introduced as a tool for our approach. Let VV be a complement of g\mathfrak{g} in EE: the unified product gV\mathfrak{g} \,\natural \, V is associated to a system (,,f,{,})(\triangleleft, \, \triangleright, \, f, \{-, \, -\}) consisting of two actions \triangleleft and \triangleright, a generalized cocycle ff and a twisted Jacobi bracket {,}\{-, \, -\} on VV. There exists a Lie algebra structure [,][-,-] on EE containing g\mathfrak{g} as a Lie subalgebra if and only if there exists an isomorphism of Lie algebras (E,[,])gV(E, [-,-]) \cong \mathfrak{g} \,\natural \, V. All such Lie algebra structures on EE are classified by two cohomological type objects which are explicitly constructed. The first one Hg2(V,g){\mathcal H}^{2}_{\mathfrak{g}} (V, \mathfrak{g}) will classify all Lie algebra structures on EE up to an isomorphism that stabilizes g\mathfrak{g} while the second object H2(V,g){\mathcal H}^{2} (V, \mathfrak{g}) provides the classification from the view point ofthe extension problem. Several examples that compute both classifying objects Hg2(V,g){\mathcal H}^{2}_{\mathfrak{g}} (V, \mathfrak{g}) and H2(V,g){\mathcal H}^{2} (V, \mathfrak{g}) are worked out in detail in the case of flag extending structures.

Keywords

Cite

@article{arxiv.1301.5442,
  title  = {Extending structures for Lie algebras},
  author = {A. L. Agore and G. Militaru},
  journal= {arXiv preprint arXiv:1301.5442},
  year   = {2014}
}

Comments

To appear in Monatshefte f\"ur Mathematik

R2 v1 2026-06-21T23:14:01.945Z