Jacobson identities for post-Lie algebras in positive characteristic
Abstract
Let p be a prime number. Given a restricted Lie algebra over a field of characteristic p and a post-Lie operation over it, we prove the Jacobson identities for a p-structure built from the Lie bracket and the post-Lie operation, called sub-adjacent p-structure. Furthermore, we give sufficient conditions for the sub-adjacent Lie algebra to be restricted if equipped with this sub-adjacent p-structure. This construction is ''axiomatized'' by introducing the notion of restricted post-Lie algebras, and we work out several examples.
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