Rigid cohomology over Laurent series fields III: Absolute coefficients and arithmetic applications

Abstract

In this paper we investigate the arithmetic aspects of the theory of EK-valued rigid cohomology introduced and studied in [11,12]. In particular we show that these cohomology groups have compatible connections and Frobenius structures, and therefore are naturally (,∇)-modules over EK whenever they are finite dimensional. We also introduce a category of `absolute' coefficients for the theory; the same results are true for cohomology groups with coefficients. We moreover prove a p-adic version of the weight monodromy conjecture for smooth (not necessarily proper) curves, and use a construction of Marmora to prove a version of -independence for smooth curves over k(\!(t)\!) that includes the case =p. This states that after tensoring with RK, our p-adic cohomology groups agree with the -adic Galois representations Hi\'et(Xk(\!(t)\!)sep,Q) for ≠ p.