Kummer-faithfulness over $p$-adic fields
Number Theory
2025-11-07 v1
Abstract
The notion of a Kummer-faithful field, defined by Mochizuki, is expected as one of suitable base fields for anabelian geometry. In this paper, we study Kummer-faithfulness for algebraic extension fields of -adic fields. We show that Kummer-faithfulness for such fields are deeply related with various finiteness properties on torsion points of (semi-)abelian varieties. For example, a Galois extension of a -adic field is Kummer-faithful with finite residue field if and only if, for any finite extension of and any abelian variety over ,its -rational torsion subgroup is finite. In addition, we study Kummer-faithfulness for Lubin-Tate extension fields.
Keywords
Cite
@article{arxiv.2511.04186,
title = {Kummer-faithfulness over $p$-adic fields},
author = {Yoshiyasu Ozeki},
journal= {arXiv preprint arXiv:2511.04186},
year = {2025}
}
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25 pages