Gersten-type conjecture for henselian local rings of normal crossing varieties

Abstract

Let n≥ 0 and r>0 be integers. Let OX, xh be the henselization of the local ring OX, x of a scheme X at a point x∈ X. For a normal crossing variety Y over the spectrum of a field k of positive characteristic p>0, K.Sato defined an \'etale logarithmic Hodge-Witt sheaf λnY, r on the \'etale site Yet which agrees with WrnY, in the case where Y is smooth over Spec(k). In this paper, we prove the Gersten-type conjecture for \'etale sheaves which satisfy some properties over OY, yh. For example, λY, rn and μl n satisfy these properties where μl is the \'etale sheaf of l-th roots of unity for an integer l which is prime to the characteristic of Y. Let B be a discrete valuation ring of mixed characteristic (0, p) and X a semistable family over Spec(B). Suppose that B contains p-th roots of unity. As an application of the Gersten-type conjecture for λnr, we prove the relative version of the Gersten-type conjecture for the p-adic \'etale Tate twist T1(n) over OX, xh. Moreover, we prove a generalization of Artin's theorem about the Brauer groups.