Constructible nabla-modules on curves

Abstract

Let V be a discrete valuation ring of mixed characteristic with perfect residue field. Let X be a geometrically connected smooth proper curve over V. We introduce the notion of constructible convergent ∇-module on the analytification XKan of the generic fibre of X. A constructible module is an OXKan-module which is not necessarily coherent, but becomes coherent on a stratification by locally closed subsets of the special fiber Xk of X. The notions of connection, of (over-) convergence and of Frobenius structure carry over to this situation. We describe a specialization functor from the category of constructible convergent ∇-modules to the category of D X Q-modules. We show that if X is endowed with a lifting of the absolute Frobenius of X, then specialization induces an equivalence between constructible F-∇-modules and perverse holonomic F- D X Q-modules.