A prismatic-etale comparison theorem in the semistable case (2507.08451v1)

Abstract: Let $K|\mathbb{Q}p$ be a complete discrete valuation field with perfect residue field, $O_K$ be its ring of integers. Consider a semistable $p$-adic formal scheme $X$ over $\mathrm{Spf}(O_K)$ with smooth generic fiber $X{\eta}$. Du--Liu--Moon--Shimizu showed recently that the category of analytic prismatic $F$-crystals on the absolute log prismatic site of $X$ is equivalent to the category of semistable \'etale $\mathbb{Z}p$-local systems on the adic generic fiber $X{\eta}$. In this article, we prove a comparison between the Breuil--Kisin cohomology of an analytic log prismatic $F$-crystal on $X$ and the \'etale cohomology of its corresponding \'etale $\mathbb{Z}_p$-local system. This generalizes Guo--Reneicke's prismatic--\'etale comparison for crystalline $\mathbb{Z}_p$-local systems to the semi-stable case