Multiplicative valued difference fields

Abstract: The theory of valued difference fields (K, σ, v) depends on how the valuation v interacts with the automorphism σ. Two special cases have already been worked out -the isometric case, where v(σ(x)) = v(x) for all x ∈ K, has been worked out by Luc Belair, Angus Macintyre and Thomas Scanlon [2]; and the contractive case, where v(σ(x)) > nv(x) for all n ∈ N and x ∈ K × with v(x) > 0, has been worked out by Salih Azgin [4]. In this paper we deal with a more general version, called the multiplicative case, where v(… Show more

“…One may show in the same way that in the multiplicative case from [Pal12] (see Remark 2.17), the valued difference field is NTP 2 , provided RV (with the induced structure) is NTP 2 .…”

“…In the setting of so-called multiplicative valued difference fields, forming a common generalisation of the contractive and the isometric case, Pal established similar Ax-Kochen-Ershov type results (see [Pal12]), even without adding an angular component map and working in the appropriate language for the RV sort, where RV = K × /1 + m.…”

“…Most of the material in the contractive case may be found in [Azg10], but we will also need the context from [Azg07], where an angular component is used instead of a cross-section. See also [Pal12,Gia11], and the unpublished notes [Hru02] of Hrushovski, where most of the ideas in the contractive case already appear.…”

Valued difference fields and NTP2

“…One may show in the same way that in the multiplicative case from [Pal12] (see Remark 2.17), the valued difference field is NTP 2 , provided RV (with the induced structure) is NTP 2 .…”

“…In the setting of so-called multiplicative valued difference fields, forming a common generalisation of the contractive and the isometric case, Pal established similar Ax-Kochen-Ershov type results (see [Pal12]), even without adding an angular component map and working in the appropriate language for the RV sort, where RV = K × /1 + m.…”

“…Most of the material in the contractive case may be found in [Azg10], but we will also need the context from [Azg07], where an angular component is used instead of a cross-section. See also [Pal12,Gia11], and the unpublished notes [Hru02] of Hrushovski, where most of the ideas in the contractive case already appear.…”

Valued difference fields and NTP2

“…There have also been attempts at extending those results to valued fields with more structure. The two most notable enrichments that have been studied are, on the one hand, analytic structures as initiated by [14] and studied thereafter by a great number of people (among many others [32,33,22,23,11,10]) and, on the other hand, D-structures (a generalization of both difference and differential structures), first for derivations and certain isometries in [29] but also for greater classes of isometries in [30,8,4] and then for automorphisms that might not be isometries [3,25,18,17,15]. The model theory of valued differential fields is also quite central to the model theoretic study of transseries (see for example [1]) but the techniques and results in this last field seem quite orthogonal to those in other references given above and to our work here.…”

Some Properties of Analytic Difference Valued Fields

“…However, in his thesis [8], the second-named author noted that if one placed more restrictions on the automorphism, then it is sometimes possible for the expanded theory to have a model companion.…”

Model companion of ordered theories with an automorphism