Poisson n-Lie algebras: constructions and the structure of solvable algebras

Abstract

In this paper, we develop a construction of Poisson n-Lie algebras arising from n-Lie algebras of Jacobians and establish conditions under which this construction yields a Poisson n-Lie algebra. We also formulate a general conjecture in the unital case. In addition, we show that tensor products of Poisson algebras admit natural Poisson n-Lie structures via suitable quotient constructions. Conversely, we construct a Poisson algebra from a given Poisson n-Lie algebra, thereby establishing a correspondence between these classes of algebras. Furthermore, we obtain analogues of Engel's and Lie's theorems and provide a characterization of solvable and nilpotent Poisson n-Lie algebras in terms of the underlying algebraic structures. We also introduce the notion of hypo-nilpotent ideals and prove results concerning maximal hypo-nilpotent ideals in finite-dimensional solvable Poisson n-Lie algebras. Finally, we show that generalized eigenspaces of multiplication operators form ideals.