A note on existentially t-henselian fields
Abstract
A field is existentially t-henselian if it is has the same existential theory in the first-order language of rings as a field that admits a nontrivial henselian valuation. This property turns out to be equivalent to Z-largeness, which is a property identified in previous work with Fehm, and which holds for F if and only if tF[\![t]\!] is not Diophantine in F(\!(t)\!), without extra constants. In this short note, we further investigate this property in order to count the number of existential theories of henselian valuations on a given field, and to find other characterizations of existential t-henselianity.
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