Integral filtered Sen theory and applications
Abstract
We study Nygaard-, conjugate-, and Hodge filtrations on the many variants of Breuil--Kisin modules associated to integral semi-stable Galois representations. This leads to an integral Sen operator satisfying certain ``1-degree shrinking" on the increasing conjugate filtration, and (in special cases) a mod p Sen operator satisfying certain ``p-degree shrinking". These constructions are related with prismatic F-crystals, Hodge--Tate crystals and F-gauges, and have explicit relations with classical (non-prismatic) operators. As applications, we obtain vanishing and torsion bound results on graded of the integral Hodge filtration; our explicit methods also recover results of Gee--Kisin and Bhatt--Gee--Kisin concerning the mod p Hodge filtrations and Frobenius structures.
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