Fontaine-Laffaille Theory over Power Series Rings

Abstract

Let k be a perfect field of characteristic p > 2. We extend the equivalence of categories between Fontaine-Laffaille modules and Zp lattices inside crystalline representations with Hodge-Tate weights at most p-2 of Fontaine and Laffaille to the situation where the base ring is the power series ring over the Witt vectors W(k)[\![ t1, ·s , td]\!] and where the base ring is a p-adically complete ring that is \'etale over the Tate Algebra W(k) t1 1, ·s , td 1.

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