Rational points over finite fields for regular models of algebraic varieties of Hodge type ≥ 1

Abstract

Let R be a discrete valuation ring of mixed characteristics (0,p), with finite residue field k and fraction field K, let k' be a finite extension of k, and let X be a regular, proper and flat R-scheme, with generic fibre XK and special fibre Xk. Assume that XK is geometrically connected and of Hodge type ≥ 1 in positive degrees. Then we show that the number of k'-rational points of X satisfies the congruence |X(k')| 1 mod |k'|. Thanks to BBE07, we deduce such congruences from a vanishing theorem for the Witt cohomology groups Hq(Xk, WXk,), for q > 0. In our proof of this last result, a key step is the construction of a trace morphism between the Witt cohomologies of the special fibres of two flat regular R-schemes X and Y of the same dimension, defined by a surjective projective morphism f : Y X.