The Cech filtration and monodromy in log crystalline cohomology

Abstract

For a strictly semistable log scheme Y over a perfect field k of characteristic p we investigate the canonical Cech spectral sequence (C)T abutting to the Hyodo-Kato (log crystalline) cohomology Hcrys*(Y/T)Q of Y and beginning with the log convergent cohomology of its various component intersections Yi. We compare the filtration on Hcrys*(Y/T)Q arising from (C)T with the monodromy operator N on Hcrys*(Y/T)Q. We also express N through residue maps and study relations with singular cohomology. If Y lifts to a proper strictly semistable (formal) scheme X over a finite totally ramified extension of W(k), with generic fibre XK, we obtain results on how the simplicial structure of XKan (as analytic space) is reflected in HdR*(XK)=HdR*(XKan).