An explicit bound on reducibility of mod l Galois image for Drinfeld modules of arbitrary rank and its application on the uniformity problem

Abstract

Suppose we are given a Drinfeld Module φ over Fq(t) of rank r and a prime ideal l of Fq[T]. In this paper, we prove that the reducibility of mod l Galois representation Gal(Fq(T)sep/Fq(T))→ Aut(φ[l]) GLr(Fl) gives a bound on the degree of l which depends only on the rank r of Drinfeld module φ and the minimal degree of place P where φ has good reduction at P. Then, we apply this reducibility bound to study the Drinfeld module analogue of Serre's uniformity problem.