Rigid local systems and finite general linear groups
Abstract
We use hypergeometric sheaves on , which are particular sorts of rigid local systems, to construct explicit local systems whose arithmetic and geometric monodromy groups are the finite general linear groups for any and and any prime power , so long as when . This paper continues a program of finding simple (in the sense of simple to remember) families of exponential sums whose monodromy groups are certain finite groups of Lie type, cf. [Gr], [KT1], [KT2], [KT3] for (certain) finite symplectic and unitary groups, or certain sporadic groups, cf. [KRL], [KRLT1], [KRLT2], [KRLT3]. The novelty of this paper is obtaining in this hypergeometric way. A pullback construction then yields local systems on whose geometric monodromy groups are . These turn out to recover a construction of Abhyankar.
Cite
@article{arxiv.2002.05863,
title = {Rigid local systems and finite general linear groups},
author = {Nicholas M. Katz and Pham Huu Tiep},
journal= {arXiv preprint arXiv:2002.05863},
year = {2020}
}
Comments
26 pages