Rigid local systems and finite general linear groups

Abstract

We use hypergeometric sheaves on Gm/Fq, 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 GLn(q) for any n 2 and and any prime power q, so long as q > 3 when n=2. 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 GLn(q) in this hypergeometric way. A pullback construction then yields local systems on A1/Fq whose geometric monodromy groups are SLn(q). These turn out to recover a construction of Abhyankar.