NIP henselian valued fields

Archive for Mathematical Logic 59 (1-2):167-178 (2020)
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Abstract

We show that any theory of tame henselian valued fields is NIP if and only if the theory of its residue field and the theory of its value group are NIP. Moreover, we show that if is a henselian valued field of residue characteristic \=p\) such that if \, depending on the characteristic of K either the degree of imperfection or the index of the pth powers is finite, then is NIP iff Kv is NIP and v is roughly separably tame.

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Citations of this work

Henselian expansions of NIP fields.Franziska Jahnke - 2023 - Journal of Mathematical Logic 24 (2).
Burden of Henselian Valued Fields in the Denef–Pas Language.Peter Sinclair - 2022 - Notre Dame Journal of Formal Logic 63 (4):463-480.

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