Cycle carac\'eristique pour les D-modules coadmissibles sur une courbe formelle

Abstract

Let X be a formal smooth quasi-compact curve over a complete discrete valuation ring of mixed characteristic. We consider over X the sheaves of differential operators D(0)X, k , Q with a congruence level k ∈ N and their projective limit DX, ∞ = k D(0)X, k , Q. In this article, we define a characteristic variety for coadmissible DX, ∞-modules as a closed subset of the cotangent space T*X. For this purpose, we introduce a microlocalization sheaf of DX, ∞ in which the derivation is locally invertible. We deduce a notion of "sub-holonomicity" for coadmissible DX, ∞-modules which is equivalent to being generically an integrable connection. Finally, we associate characteristic cycles to sub-holonomic modules proving that the latter are of finite length.