Birational and A1-invariant lattices in the cohomology of the structure sheaf over non-archimedean fields

Abstract

We show that the cohomology of the structure sheaf of smooth and proper schemes over a complete non-archimedean field K of characteristic zero, can be refined to an A1-invariant cohomology theory of smooth (not necessarily proper) schemes over K with values in OK-lattices, and the same holds for K of positive characteristic in dimensions at most 3. As one application, we obtain that the automorphism group of the function field of a proper smooth variety X of dimension at most 3 over a field of positive characteristic acts quasi-unipotently on the cohomology of the structure sheaf of X. The construction of the lattices relies on a variant of the tame cohomology of Hübner--Schmidt with coefficients in a twisted version of the tame structure sheaf and uses results from rigid analytic geometry on the cohomology of twisted integral rigid structure sheaves due to Bartenwerfer and van der Put.