Editing Semisimple Lie algebra (section)

== Generalizations ==
{{Main|Reductive Lie algebra|Split Lie algebra}}
Semisimple Lie algebras admit certain generalizations. Firstly, many statements that are true for semisimple Lie algebras are true more generally for [[reductive Lie algebra]]s. Abstractly, a reductive Lie algebra is one whose adjoint representation is [[completely reducible]], while concretely, a reductive Lie algebra is a direct sum of a semisimple Lie algebra and an [[abelian Lie algebra]]; for example, <math>\mathfrak{sl}_n</math> is semisimple, and <math>\mathfrak{gl}_n</math> is reductive. Many properties of semisimple Lie algebras depend only on reducibility.

Many properties of complex semisimple/reductive Lie algebras are true not only for semisimple/reductive Lie algebras over algebraically closed fields, but more generally for [[split Lie algebra|split semisimple/reductive Lie algebras]] over other fields: semisimple/reductive Lie algebras over algebraically closed fields are always split, but over other fields this is not always the case. Split Lie algebras have essentially the same representation theory as semisimple Lie algebras over algebraically closed fields, for instance, the [[splitting Cartan subalgebra]] playing the same role as the [[Cartan subalgebra]] plays over algebraically closed fields. This is the approach followed in {{Harv|Bourbaki|2005}}, for instance, which classifies representations of split semisimple/reductive Lie algebras.