Hodge structure on the fundamental group and its application to p-adic integration
Abstract
We study the unipotent completion DRun(x0, x1, XK) of the de Rham fundamental groupoid [De] of a smooth algebraic variety over a local non-archimedean field K of characteristic 0. We show that the vector space DRun(x0, x1, XK) possesses a distinguished element. In the other words, given a vector bundle E on XK together with a unipotent integrable connection, we have a canonical isomorphism Ex0 Ex1 between the fibers. The latter construction is a generalization of Colmez's p-adic integration (rk E=2) and Coleman's p-adic iterated integrals (XK is a curve with good reduction). In the second part we prove that, if XK0 is a smooth variety over an unramified extension of Qp with good reduction and r ≤ p-12 then there is a canonical isomorphism DRr(x0, x1, XK0) BDR etr(x0, x1, X K0) BDR compatible with the action of Galois group (Here DRr(x0, x1, XK0) is the level r quotient of DRun(x0, x1, XK)). In particularly, it implies the Crystalline Conjecture for the fundamental group [Shiho] (for r ≤ p-12) .
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