par Lecoutre, César Simon 
;Topley, Lewis
Référence Algebras and representation theory
Publication Publié, 2019
;Topley, LewisRéférence Algebras and representation theory
Publication Publié, 2019
Article révisé par les pairs
| Résumé : | If g is a Lie algebra then the semi-centre of the Poisson algebra S(g) is the subalgebra generated by ad (g) -eigenvectors. In this paper we abstract this definition to the context of integral Poisson algebras. We identify necessary and sufficient conditions for the Poisson semi-centre A sc to be a Poisson algebra graded by its weight spaces. In that situation we show the Poisson semi-centre exhibits many nice properties: the rational Casimirs are quotients of Poisson normal elements and the Poisson Dixmier–Mœglin equivalence holds for A sc . |
