Maximal tori of monodromy groups of F-isocrystals and an application to abelian varieties

Abstract

Let X0 be a smooth geometrically connected variety defined over a finite field Fq and let E0 be an irreducible overconvergent F-isocrystal on X0. We show that if a subobject of minimal slope of the associated convergent F-isocrystal E0 admits a non-zero morphism to OX0 as a convergent isocrystal, then E0 is isomorphic to OX0 as an overconvergent isocrystal. This proves a special case of a conjecture of Kedlaya. The key ingredient in the proof is the study of the monodromy group of E0 and the subgroup defined by E0. The new input in this setting is that the subgroup contains a maximal torus of the entire monodromy group. This is a consequence of the existence of a Frobenius torus of maximal dimension. As an application, we prove a finiteness result for the torsion points of abelian varieties, which extends the previous theorem of Lang--N\'eron and answers positively a question of Esnault.