Syntomification and crystalline local systems
Abstract
Let p be a prime, and let X be a smooth p-adic formal scheme over Spf OK where K/Qp is a finite extension. We show that reflexive sheaves on the stack XSyn are equivalent to Zp-lattices in crystalline local systems on the rigid generic fiber Xη, and then use this to study the essential image of the étale realization functor on the isogeny category of perfect complexes on XSyn. We also show that when X/Spf OK is smooth and proper that Perf(XSyn)[1/p] is equivalent to a category of admissible filtered F-isocrystals in perfect complexes.
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