# Definable V-topologies, Henselianity and NIP

**Authors:** Yatir Halevi, Assaf Hasson, Franziska Jahnke

arXiv: 1901.05920 · 2019-02-15

## TL;DR

This paper explores the uniqueness of definable V-topologies in t-henselian NIP fields, linking Shelah's conjecture to henselianity and establishing new conditions for NIP fields with dp-minimal residue fields.

## Contribution

It establishes the uniqueness of definable V-topologies on t-henselian NIP fields and connects Shelah's conjecture to the henselianity conjecture for NIP fields.

## Key findings

- At most one definable V-topology exists on a t-henselian NIP field.
- In bi-valued NIP fields, henselian and t-henselian valuations are comparable or dependent.
- Shelah's conjecture implies the henselianity conjecture for NIP fields, proved for fields with dp-minimal residue fields.

## Abstract

We initiate the study of definable V-topolgies and show that there is at most one such V-topology on a t-henselian NIP field. Equivalently, we show that if $(K,v_1,v_2)$ is a bi-valued NIP field with $v_1$ henselian (resp. t-henselian) then $v_1$ and $v_2$ are comparable (resp. dependent).   As a consequence Shelah's conjecture for NIP fields implies the henselianity conjecture for NIP fields. Furthermore, the latter conjecture is proved for any field admitting a henselian valuation with a dp-minimal residue field.   We conclude by showing that Shelah's conjecture is equivalent to the statement that any NIP field not contained in the algebraic closure of a finite field is t-henselian.

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Source: https://tomesphere.com/paper/1901.05920