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Skeletal filtrations of the fundamental group of a non-archimedean curve

Helminck, Paul Alexander

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Authors

Paul Alexander Helminck



Abstract

In this paper we study skeleta of residually tame coverings of a marked curve over a non-archimedean field. We first prove a simultaneous semistable reduction theorem for residually tame coverings, which we then use to construct a tropicalization functor from the category of residually tame coverings of a marked curve to the category of tame coverings of a metrized complex Σ associated to . We enhance the latter category by adding a set of gluing data to every covering and we show that this yields an equivalence of categories. We use this skeletal interpretation to define the absolute decomposition and inertia group of a curve, which can be seen as the first subgroups in a ramification filtration of the fundamental group of the curve. We prove that the cyclic coverings that arise from the corresponding decomposition and inertia quotients coincide with the coverings that arise from the toric and connected parts of the analytic Jacobian of the curve.

Citation

Helminck, P. A. (2023). Skeletal filtrations of the fundamental group of a non-archimedean curve. Advances in Mathematics, 431, Article 109242. https://doi.org/10.1016/j.aim.2023.109242

Journal Article Type Article
Acceptance Date Jul 21, 2023
Online Publication Date Aug 14, 2023
Publication Date 2023-10
Deposit Date Sep 20, 2023
Publicly Available Date Sep 20, 2023
Journal Advances in Mathematics
Print ISSN 0001-8708
Publisher Elsevier
Peer Reviewed Peer Reviewed
Volume 431
Article Number 109242
DOI https://doi.org/10.1016/j.aim.2023.109242
Keywords General Mathematics
Public URL https://durham-repository.worktribe.com/output/1744316

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