Kisin modules with descent data and parahoric local models
Abstract
We construct a moduli space Yμ, τ of Kisin modules with tame descent datum τ and with fixed p-adic Hodge type ≤ μ, for some finite extension K/Qp. We show that this space is smoothly equivalent to the local model for ResK/Qp GLn, cocharacter \ μ \, and parahoric level structure. We use this to construct the analogue of Kottwitz-Rapoport strata on the special fiber Yμ, τ indexed by the μ-admissible set. We also relate Yμ, τ to potentially crystalline Galois deformation rings.
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