Hirsch weight-filtered log crystalline complex and Hirsch weight-filtered log crystalline dga of a proper SNCL scheme in characteristic p>0

Abstract

We construct a theory of the derived PD-Hirsch extension of the log crystalline complex of a log smooth scheme and we construct a fundamental filtered dga (H zar, TW,P) and a fundamental filtered complex (H zar,P) for a simple normal crossing log scheme X over a family of log points by using the log crystalline method in order to overcome obstacles arising from the incompatibility of the p-adic Steenbrink complexes in [M] and [Nak4] with the cup product of the log crystalline complex of X. When the base log scheme is the log point of a perfect field of characteristic p>0, we prove that (H zar, TW,P) and (H zar,P) is canonically isomorphic to Kim and Hain's filtered dga and their filtered complex in [KH], respectively.