Multivariable p-adic Hodge theory for products of Galois groups

Abstract

In this paper we explain how to attach to a family of p-adic representations of a product of Galois groups an overconvergent family of multivariable (,)-modules, generalizing results from Pal-Zabradi and Carter-Kedlaya-Zabradi, using Colmez-Sen-Tate descent. We also define rings of multivariable crystalline and semistable periods, and explain how to recover this multivariable p-adic theory attached to a family of representations from its multivariable (,)-module. We also explain how our framework allows us to recover the main results of Brinon-Chiarellotto-Mazzari on multivariable p-adic Galois representations.

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