HENSELIAN RESIDUALLY p-ADICALLY CLOSED FIELDS

Cross-Sections for p-Adically Closed Fields

and cross-section g g G ¬ t. w x If p is prime, a p-valued field 8, p. 7 is a valued field, of characteristic zero, in which p has minimal positive value and whose residue field has p Ž . elements. A p-valued field F, ̈ is p-adically closed just in case no algebraic extension F9 of F with valuation ̈ 9 extending ̈ is p-valued. The Ž . class of p-adically closed fields is to Q , ̈ as the class of re...

When Does Nip Transfer from Fields to Henselian Expansions?

Let K be an NIP field and let v be a henselian valuation on K. We ask whether (K, v) is NIP as a valued field. By a result of Shelah, we know that if v is externally definable, then (K, v) is NIP. Using the definability of the canonical p-henselian valuation, we show that whenever the residue field of v is not separably closed, then v is externally definable. We also give a weaker statement for...

The Elementary Theory of Free Pseudo p-adically Closed Fields of Finite Corank

Dense subfields of henselian fields, and integer parts

We show that every henselian valued field L of residue characteristic 0 admits a proper subfield K which is dense in L. We present conditions under which this can be taken such that L|K is transcendental and K is henselian. These results are of interest for the investigation of integer parts of ordered fields. We present examples of real closed fields which are larger than the quotient fields o...

Existential ∅-Definability of Henselian Valuation Rings

In [1], Anscombe and Koenigsmann give an existential ∅-definition of the ring of formal power series F [[t]] in its quotient field in the case where F is finite. We extend their method in several directions to give general definability results for henselian valued fields with finite or pseudo-algebraically closed residue fields. §