English

Multivariable de Rham representations, Sen theory and $p$-adic differential equations

Number Theory 2024-09-16 v2

Abstract

Let KK be a complete valued field extension of Qp\mathbf{Q}_p with perfect residue field. We consider pp-adic representations of a finite product GK,Δ=GKΔG_{K,\Delta}=G_K^\Delta of the absolute Galois group GKG_K of KK. This product appears as the fundamental group of a product of diamonds. We develop the corresponding pp-adic Hodge theory by constructing analogues of the classical period rings BdR\mathsf{B}_{\rm dR} and BHT\mathsf{B}_{\rm HT}, and multivariable Sen theory. In particular, we associate to any pp-adic representation VV of GK,ΔG_{K,\Delta} an integrable pp-adic differential system in several variables Ddif(V)\mathsf{D}_{\rm dif}(V). We prove that this system is trivial if and only if the representation VV is de Rham. Finally, we relate this differential system to the multivariable overconvergent (φ,Γ)(\varphi,\Gamma)-module of VV constructed by Pal and Z\'abr\'adi, along classical Berger's construction.

Keywords

Cite

@article{arxiv.2111.11563,
  title  = {Multivariable de Rham representations, Sen theory and $p$-adic differential equations},
  author = {Olivier Brinon and Bruno Chiarellotto and Nicola Mazzari},
  journal= {arXiv preprint arXiv:2111.11563},
  year   = {2024}
}

Comments

minor corrections, new format, to be published in Mathematical Research Letters Vol.31, no.1

R2 v1 2026-06-24T07:48:11.307Z