On the semisimplicity of reductions and adelic openness for E-rational compatible systems over global function fields

Abstract

Let X be a normal geometrically connected variety over a finite field of characteristic~p. Let E be a number field. Using automorphic methods over global function fields, we derive properties of the geometric monodromy groups of arbitrary connected E-rational semisimple compatible systems (λ) of n-dimensional representations of the arithmetic fundamental group π1(X), where λ ranges over the finite places of E not above p: Let λ be any π1(X)-stable lattice in Eλn under λ. Then for almost all λ, the schematic closure of the geometric monodromy λ(π1(X)) in AutOλ(λ) is a semisimple Oλ-group scheme, and its special fiber agrees with the Nori envelope of the geometric monodromy of the mod-λ reduction of λ. A comparable result under different hypotheses was recently proved by Cadoret, Hui and Tamagawa by other methods. We also provide natural criteria for the image of π1(X) under Πλλ to have adelic open image in an appropriate sense.