# Reconstruction anab\'elienne du squelette des courbes analytiques

**Authors:** Sylvain Gaulhiac

arXiv: 1904.03126 · 2021-11-09

## TL;DR

This paper demonstrates that the tempered fundamental group of certain Berkovich analytic curves uniquely determines their skeletons, extending anabelian geometry concepts beyond algebraic curves to more general analytic settings.

## Contribution

It introduces a method to recover the analytic skeleton of Berkovich curves from their tempered fundamental group, generalizing Mochizuki's algebraic results to non-algebraic curves.

## Key findings

- The tempered fundamental group determines the analytic skeleton of Berkovich curves.
- The Drinfeld half-plane is an example of an analytically anabelian curve.
- The work extends anabelian geometry to non-algebraic analytic curves.

## Abstract

In this work we bring to light some anabelian behaviours of analytic curves in the setting of Berkovich geometry. We show more precisely that the knowledge of the tempered fundamental group of some curves that we call analytically anabelian determines their analytic skeletons as graphs. The tempered fundamental group of a Berkovich space, introduced by Andr\'e, enabled Mochizuki to prove the first result of anabelian geometry in Berkovich geometry concerning analytifications of algebraic hyperbolic curves over $\overline{\mathbb{Q}}_p$. To that end, Mochizuki developed the categorical language of semi-graphs of anabelio\"ids and tempero\"ids. Our work consists in associating a graph of anabelio\"ids to a Berkovich curve equipped with a minimal triangulation and in adapting the results of Mochizuki in order to recover the analytic skeleton of the curve. The novelty of this anabelian result in Berkovich geometry is that the curves we are interested in are not supposed anymore to be of algebraic nature. We show for example that the famous Drinfeld half-plane is an analytically anabelian curve.

## Full text

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## Figures

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## References

23 references — full list in the complete paper: https://tomesphere.com/paper/1904.03126/full.md

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Source: https://tomesphere.com/paper/1904.03126