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Overconvergent de Rham-Witt cohomology for semistable varieties

We define an overconvergent version of the Hyodo-Kato complex for semistable varieties $Y$ over perfect fields of positive characteristic, and prove that its hypercohomology tensored with $\mathbb{Q}$ recovers the log-rigid cohomology when $Y$ is quasi-projective. We then describe the monodromy operator using the overconvergent Hyodo-Kato complex. Finally, we show that overconvergent Hyodo-Kato cohomology agrees with log-crystalline cohomology in the projective semistable case.

preprint2020arXivOpen access
Oliver GregoryAndreas Langer
math.AGmath.NT
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Oliver GregoryAndreas Langer

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