Difference between revisions of "Wedderburn-Mal'tsev theorem"

Let be a finite-dimensional associative algebra (cf. Associative rings and algebras) over a field with radical , and let the quotient algebra be a separable algebra (for algebras over a field of characteristic zero this is always true). Then can be decomposed (as a linear space) into a direct sum of the radical and some semi-simple subalgebra :

and if there exists another decomposition , where is a semi-simple subalgebra, then there exists an automorphism of the algebra which maps onto (the automorphism is inner, i.e. there exist elements such that and for all , where ). The existence of this decomposition was shown by J.H.M. Wedderburn [1] and the uniqueness, up to an automorphism of the semi-simple term, was proved by A.I. Mal'tsev [2]. This theorem, together with Wedderburn's theorem (cf. Associative rings and algebras) on the structure of semi-simple algebras constitutes the central part of the classical theory of finite-dimensional algebras.

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A similar theorem holds for Lie algebras. Let be a finite-dimensional Lie algebra over a field of characteristic zero with radical . Then there exists a semi-simple subalgebra of such that . Such a decomposition is called a Levi decomposition and is called a Levi factor or Levi subalgebra. It is unique up to inner automorphisms.

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