A cut-by-curves criterion for overconvergent of F-isocrystals

Abstract

Let X be a smooth scheme over a finite field. It is conjectured that a convergent F-isocrystal on X is overconvergent if its restriction to every curve contained in X is overconvergent. Using the theory of \'etale and crystalline companions, we establish a weaker version of this criterion in which we also assume that the wild local monodromy of the restrictions to curves is trivialized by pullback along a single dominant morphism to X.