Abstract
We construct a category of Breuil–Kisin $G\_K$-modules to classify integral semi-stable Galois representations. Our theory uses Breuil–Kisin modules and Breuil–Kisin–Fargues modules with Galois actions, and can be regarded as the algebraic avatar of the integral $p$-adic cohomology theories of Bhatt–Morrow–Scholze and Bhatt–Scholze. As a key ingredient, we classify Galois representations that are of finite $E(u)$-height.
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