Jordan-Chevalley decomposition in Lie algebras
Abstract
We prove that if s is a solvable Lie algebra of matrices over a field of characteristic 0, and A∈s, then the semisimple and nilpotent summands of the Jordan-Chevalley decomposition of A belong to s if and only if there exist S,N∈s, S is semisimple, N is nilpotent (not necessarily [S,N]=0) such that A=S+N.
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