Syst\`emes inductifs surcoh\'erents de D-modules arithm\'etiques logarithmiques

Abstract

Let V be a complete discrete valuation ring of unequal characteristic with perfect residue field, P be a smooth, quasi-compact, separated formal scheme over V, Z be a strict normal crossing divisor of P and P := (P, Z) the induced smooth formal log-scheme over V. In Berthelot's theory of arithmetic D-modules, we work with the inductive system of sheaves of rings DP () := (DP (m))m∈ N, where DP (m) is the p-adic completion of the ring of differential operators of level m over P. Moreover, he introduced the sheaf D P ,Q:=m\, DP (m) ZQ of differential operators over P of finite level. In this paper, we define the notion of overcoherence for complexes of DP () -modules and check that this notion is compatible to that of overcoherence for complexes of D P,Q-modules.