Real closed fields with nonstandard and standard analytic structure

Abstract

We consider the ordered field which is the completion of the Puiseux series field over equipped with a ring of analytic functions on [-1,1]n which contains the standard subanalytic functions as well as functions given by t-adically convergent power series, thus combining the analytic structures from [DD] and [LR3]. We prove quantifier elimination and o-minimality in the corresponding language. We extend these constructions and results to rank n ordered fields n (the maximal completions of iterated Puiseux series fields). We generalize the example of Hrushovski and Peterzil [HP] of a sentence which is not true in any o-minimal expansion of (shown in [LR3] to be true in an o-minimal expansion of the Puiseux series field) to a tower of examples of sentences σn, true in n, but not true in any o-minimal expansion of any of the fields ,1,...,n-1.

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