English

The Orbit Method for Poisson Orders

Representation Theory 2019-08-14 v3 Quantum Algebra Rings and Algebras

Abstract

A version of Kirillov's orbit method states that the primitive spectrum of a generic quantisation AA of a Poisson algebra ZZ should correspond bijectively to the symplectic leaves of Spec(Z)\operatorname{Spec}(Z). In this article we consider a Poisson order AA over a complex affine Poisson algebra ZZ. We stratify the primitive spectrum Prim(A)\operatorname{Prim}(A) into symplectic cores, which should be thought of as families of non-commutative symplectic leaves. We then introduce a category AA-P\mathcal{P}-Mod of AA-modules adapted to the Poisson structure on ZZ, and we show that when Spec(Z)\operatorname{Spec}(Z) is smooth with locally closed symplectic leaves, there is a natural homeomorphism from the spectrum of annihilators of simple objects in AA-P\mathcal{P}-Mod to the set of symplectic cores in Prim(A)\operatorname{Prim}(A) with its quotient topology. Several application are given to Poisson representation theory. Our main tool is the Poisson enveloping algebra AeA^e of a Poisson order AA, which captures the Poisson representation theory of AA. For ZZ regular and affine we prove a PBW theorem for AeA^e and use this to characterise the annihilators of simple Poisson modules: they coincide with the Poisson weakly locally closed, the Poisson primitive and the Poisson rational ideals. We view this as a generalised weak Poisson Dixmier--Moeglin equivalence.

Keywords

Cite

@article{arxiv.1711.05542,
  title  = {The Orbit Method for Poisson Orders},
  author = {Stephane Launois and Lewis Topley},
  journal= {arXiv preprint arXiv:1711.05542},
  year   = {2019}
}

Comments

28 pages, to appear in Proc. Lond. Math. Soc

R2 v1 2026-06-22T22:46:44.346Z