On certain integral Frobenius period maps for Shimura varieties and their reductions
Abstract
We formulate an integral Frobenius period map for the framed crystalline prismatization of the p-integral model S of a Shimura variety with good reduction. By analyzing reductions of this map, we derive a period map from the mod p fiber S of S to the moduli stack of 1-1 truncated local G-shtukas in the prismatic topology, which refines the zip period map of S within this topology. Furthermore, we show that the pair (S, S) is associated with a double G-zip. Additionally, we introduce a framework of base reduction diagrams.
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