A comparison between compactly supported rigid and D-module cohomology

Abstract

The goal of this article is to prove a comparison theorem between rigid cohomology and cohomology computed using the theory of arithmetic D-modules. To do this, we construct a specialisation functor from Le Stum's category of constructible isocrystals to the derived category of arithmetic D-modules. For objects `of Frobenius type', we show that the essential image of this functor consists of overholonomic D-modules, and lies inside the heart of the dual constructible t-structure. We use this to give a more global construction of Caro's specialisation functor sp+ for overconvergent isocrystals, which enables us to prove the comparison theorem for compactly supported cohomology.