The polynomiality of the Poisson center and semi-center of a Lie algebra and Dixmier's fourth problem

TL;DR

This paper investigates conditions under which the Poisson center and semi-center of a Lie algebra are polynomial algebras, providing criteria, counterexamples, and implications for Dixmier's fourth problem.

Contribution

It establishes necessary and sufficient conditions for polynomiality of the Poisson center and semi-center, and relates Dixmier's fourth problem to canonical truncations of Lie algebras.

Findings

Polynomiality occurs for quadratic Lie algebras of index 2 with specific properties.

Dixmier's fourth problem reduces to canonical truncations and holds for all Lie algebras up to dimension 8.

Certain classes of nilpotent and filiform Lie algebras have polynomial Poisson centers and semi-centers.

Abstract

Let L be a finite dimensional Lie algebra over an algebraically closed field k of characteristic zero. We provide necessary and also some sufficient conditions in order for its Poisson center and semi-center to be polynomial algebras over k. This occurs for instance if L is quadratic of index 2 with L not equal to [L,L] and also if L is nilpotent of index at most 2. The converse holds for filiform Lie algebras of type Ln, Qn, Rn and Wn. We also show how Dixmier's fourth problem for an algebraic Lie algebra L can be reduced to that of its canonical truncation. Moreover, Dixmier's statement holds for all Lie algebras of dimension at most eight. The nonsolvable, indecomposable ones among them possess a polynomial Poisson center and semi-center.