D-modules arithm\'etiques associ\'es aux isocristaux surconvergents. Cas lisse
Abstract
Let V be a mixed characteristic complete discrete valuation ring, P a separated smooth formal scheme over V, P its special fiber, X a smooth closed subscheme of P, T a divisor in P such that TX = T X is a divisor in X and P( T) the weak completion of the sheaf of differential operators on P with overconvergent singularities along T. We construct a fully faithful functor denoted by X P,T,+ from the category of isocrystal on X TX overconvergent along TX into the category of coherent P( T) Z Q -modules with support in X. Next, we prove the commutation of X P,T,+ with (extraordinary) inverse images and dual functors. These properties are compatible with Frobenius.
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