Quasi-Poisson Modules and Harish-Chandra $\bs{AD}$-Modules

Malihe Yousofzadeh

arXiv:2605.16950·math.RT·May 19, 2026

Quasi-Poisson Modules and Harish-Chandra $\bs{AD}$-Modules

Malihe Yousofzadeh

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TL;DR

This paper introduces quasi-Poisson modules over Lie-Rinehart pairs, establishes a correspondence with Harish-Chandra modules, and classifies simple cuspidal modules as tensor modules over a specific algebra.

Contribution

It defines quasi-Poisson modules, proves a correspondence with Harish-Chandra modules, and classifies simple cuspidal quasi-Poisson modules as tensor modules.

Findings

01

Established a one-to-one correspondence between simple cuspidal quasi-Poisson modules and Harish-Chandra modules.

02

Classified simple cuspidal quasi-Poisson modules as tensor modules over an admissible rak{gl}(m+1,n)-module.

03

Proved that each simple cuspidal quasi-Poisson module is a tensor module ot A ot \u03a9 for an admissible rak{gl}(m+1,n)-module.

Abstract

We introduce the notion of quasi-Poisson modules over Lie-Rinehart pairs and prove that for the Lie-Rinehart pair $(\dot{A}, \dot{\fk})$ in which $\dot{A} = \bbbc [t_{1}^{\pm 1}, \dots, t_{m}^{\pm 1}] \ot \Lam_{n}$ and $\dot{\fk} = Der (\dot{A})$ , there is a one-to-one correspondence between simple cuspidal quasi-Poisson modules over $(\dot{A}, \dot{\fk})$ and simple cuspidal Harish-Chndra $A \fk$ -modules for $A := \bbbc [t_{0}^{\pm 1}] \ot \dot{A}$ and $\fk := Der (A) .$ We also classify simple cuspidal quasi-Poisson modules over the Lie-Rinehart pair $(\dot{A}, \dot{\fk})$ and show that each such module is a tensor module $\dot{A} \ot Ω$ for an admissible $gl (m + 1, n)$ -module $Ω$ via a prescribed action.

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