The p-adic Simpson Correspondence (AM-193)

Author:

Abbes Ahmed,Gros Michel,Tsuji Takeshi

Abstract

The p-adic Simpson correspondence, recently initiated by Gerd Faltings, aims at describing all p-adic representations of the fundamental group of a proper smooth variety over a p-adic field in terms of linear algebra—namely Higgs bundles. This book undertakes a systematic development of the theory following two new approaches. It mainly focuses on generalized representations of the fundamental group that are p-adically close to the trivial representation. The first approach relies on a new family of period rings built from the torsor of deformations of the variety over a universal p-adic thickening defined by J. M. Fontaine. The second approach introduces a crystalline-type topos and replaces the notion of Higgs bundles with that of Higgs isocrystals. The book shows the compatibility of the two constructions and the compatibility of the correspondence with the natural cohomologies. The last part of the book contains results of wider interest in p-adic Hodge theory. The reader will find a concise introduction to Faltings' theory of almost étale extensions and a chapter devoted to the Faltings topos. Though this topos is the general framework for Faltings' approach in p-adic Hodge theory, it remains relatively unexplored.

Publisher

Princeton University Press

Cited by 8 articles. 订阅此论文施引文献 订阅此论文施引文献,注册后可以免费订阅5篇论文的施引文献,订阅后可以查看论文全部施引文献

1. Cartier smoothness in prismatic cohomology;Journal für die reine und angewandte Mathematik (Crelles Journal);2023-11-21

2. The Relative Hodge–Tate Spectral Sequence: An Overview;p-adic Hodge Theory, Singular Varieties, and Non-Abelian Aspects;2023

3. The p-adic Corlette–Simpson correspondence for abeloids;Mathematische Annalen;2022-03-07

4. Crystalline $$\mathbb {Z}_p$$-Representations and $$A_{\inf }$$-Representations with Frobenius;Simons Symposia;2020

5. Sur une q-déformation locale de la théorie de Hodge non-abélienne en caractéristique positive;Simons Symposia;2020

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