Rigidity results for Lie algebras admitting a post-Lie algebra structure

Abstract

We study rigidity questions for pairs of Lie algebras (g,n) admitting a post-Lie algebra structure. We show that if g is semisimple and n is arbitrary, then we have rigidity in the sense that g and n must be isomorphic. The proof uses a result on the decomposition of a Lie algebra g=s1 s2 as the direct vector space sum of two semisimple subalgebras. We show that g must be semisimple and hence isomorphic to the direct Lie algebra sum g s1 s2. This solves some open existence questions for post-Lie algebra structures on pairs of Lie algebras (g,n). We prove additional existence results for pairs (g,n), where g is complete, and for pairs, where g is reductive with 1-dimensional center and n is solvable or nilpotent.

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