Abstract
In this paper we consider two problems relating to the representation theory of Lie algebras ${\mathfrak g}$ of reductive algebraic groups $G$ over algebraically closed fields ${\mathbb K}$ of positive characteristic $p>0$. First, we consider the tensor product of two baby Verma modules $Z_{\chi}(\lambda)\otimes Z_{\chi'}(\mu)$ and show that it has a filtration of baby Verma modules of a particular form. Secondly, we consider the minimal-dimension representations of a reduced enveloping algebra $U_\chi({\mathfrak g})$ for a nilpotent $\chi\in{\mathfrak g}^{*}$. We show that under certain assumptions in type $A$ we can obtain the minimal-dimensional modules as quotients of certain modules obtained by base change from simple highest weight modules over ${\mathbb C}$.
Original language | English |
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Publisher | arXiv |
Publication status | Published - 26 Sept 2024 |
Bibliographical note
33 pagesKeywords
- math.RT
- math.RA
- 17B10, 17B50 (Primary), 17B08, 17B20 (Secondary)