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On Preparation Theorems for $\mathbb{R}_{an,exp}$-definable functions

Published 15 Dec 2021 in math.LO | (2112.08161v3)

Abstract: In this article we give strong versions for preparation theorems for $\mathbb{R}{an,exp}$-definable functions outgoing from methods of Lion and Rolin ($\mathbb{R}{an,exp}$ is the o-minimal structure generated by all restricted analytic functions and the global exponential function). By a deep model theoretic fact of Van den Dries, Macintyre and Marker every $\mathbb{R}{an,exp}$-definable function is piecewise given by $\mathcal{L}{an}(\exp,\log)$-terms where $\mathcal{L}{an}(\exp,\log)$ denotes the language of ordered rings augmented by all restricted analytic functions, the global exponential and the global logarithm. The idea is to consider log-analytic functions at first, i.e. functions which are iterated compositions from either side of globally subanalytic functions and the global logarithm, and then $\mathbb{R}{an,exp}$-definable functions as compositions of log-analytic functions and the global exponential.

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