English

Level structure, arithmetic representations, and noncommutative Siegel linearization

Algebraic Geometry 2022-04-07 v2 Number Theory

Abstract

Let \ell be a prime, kk a finitely generated field of characteristic different from \ell, and XX a smooth geometrically connected curve over kk. Say a semisimple representation of π1et(Xkˉ)\pi_1^{\mathrm{et}}(X_{\bar k}) is arithmetic if it extends to a finite index subgroup of π1et(X)\pi_1^{\mathrm{et}}(X). We show that there exists an effective constant N=N(X,)N=N(X,\ell) such that any semisimple arithmetic representation of π1et(Xkˉ)\pi_1^{\mathrm{et}}(X_{\bar k}) into GLn(Zˉ)\mathrm{GL}_n(\bar{\mathbb{Z}_\ell}), which is trivial mod N\ell^N, is in fact trivial. This extends a previous result of the second author from characteristic zero to all characteristics. The proof relies on a new noncommutative version of Siegel's linearization theorem and the \ell-adic form of Baker's theorem on linear forms in logarithms.

Keywords

Cite

@article{arxiv.2107.02213,
  title  = {Level structure, arithmetic representations, and noncommutative Siegel linearization},
  author = {Borys Kadets and Daniel Litt},
  journal= {arXiv preprint arXiv:2107.02213},
  year   = {2022}
}

Comments

Various corrections in response to referee's comments; accepted for publication in Crelle's Journal

R2 v1 2026-06-24T03:54:35.502Z