Frobenius structure on rigid connections and arithmetic applications
Abstract
We construct the natural Frobenius structures on two families of rigid irregular -connections on (or ) for a split simple group : (i) the -connections arising from Vinberg's -groups introduced by Chen and Yun; (ii) the Airy connection of Jakob--Kamgarpour--Yi generalizing the classical Airy equations. These data form the -adic companions of the -adic local systems introduced by Yun and Jakob--Kamgarpour--Yi. Via the Frobenius structures, we study the local monodromy representations of these local systems at the unique wildly ramified point and verify the prediction of Reeder--Yu on epipelagic Langlands parameters in our setting. We calculate the global geometric monodromy group of a special Airy -local system via its local monodromy. We show the cohomological rigidity and the physical rigidity of these local systems, as conjectured by Heinloth--Ng\^o--Yun.
Keywords
Cite
@article{arxiv.2603.09252,
title = {Frobenius structure on rigid connections and arithmetic applications},
author = {Daxin Xu and Lingfei Yi},
journal= {arXiv preprint arXiv:2603.09252},
year = {2026}
}
Comments
46 pages, comments are welcome