Solvability of Poisson algebras
Abstract
Let P be a Poisson algebra with a Lie bracket \, \ over a field of characteristic p≥ 0. In this paper, the Lie structure of P is investigated. In particular, if P is solvable with respect to its Lie bracket, then we prove that the Poisson ideal J of P generated by all elements \\\x1, x2\, \x3, x4\\, x5\ with x1,… ,x5 ∈ P is associative nilpotent of index bounded by a function of the derived length of P. We use this result to further prove that if P is solvable and p≠ 2, then the Poisson ideal \P,P\P is nil.
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