Almost \'etale extensions of Fontaine rings and log-crystalline cohomology in the semi-stable reduction case

Abstract

Let K be a field of characteristic zero complete for a discrete valuation, with perfect residue field of characteristic p>0, and let K+ be the valuation ring of K. We relate the log-crystalline cohomology of the special fibre of certain affine K+-schemes X=Spec(R) with semi-stable reduction to the Galois cohomology of the fundamental group of the geometric generic fibre π1(XK) with coefficients in a Fontaine ring constructed from R. This is based on Faltings' theory of almost \'etale extensions.