English

Small extensions of analytic fields

Algebraic Geometry 2025-11-04 v2

Abstract

An extension K/kK/k of analytic (i.e. real valued complete) fields is called small if it is topologically-algebraically generated by finitely many elements. We prove that this property is inherited by subextensions and hence topological generating degree of such extensions is monotonic. Much more detailed results are obtained in the case of degree one. Let kk be an analytic algebraically closed field of positive residual characteristic pp and K=k(t)a^K=\widehat{k(t)^a} with a non-trivial valuation. In a previous work it was shown that the set IK/kI_{K/k} of intermediate complete algebraically closed subextensions kFKk\subseteq F\subseteq K is totally ordered by inclusion. In this paper we show that IK/kI_{K/k} is an interval parameterized by the distance between tt and FF. Moreover, logarithmic parameterizations induced by other generators differ by PL functions with slopes in pZp^{\mathbb Z} and corners in K×|K^\times|, so IK/kI_{K/k} acquires a natural PL structure.

Keywords

Cite

@article{arxiv.2503.17749,
  title  = {Small extensions of analytic fields},
  author = {Michael Temkin},
  journal= {arXiv preprint arXiv:2503.17749},
  year   = {2025}
}

Comments

22 pages

R2 v1 2026-06-28T22:30:51.265Z