Sublogarithmic-transexponential series
Abstract
We adapt the construction of the field of logarithmic-exponential transseries of van den Dries, Macintyre, and Marker to build an ordered differential field of sublogarithmic-transexponential series. We use this structure to build a transexponential Hardy field closed under composition. Specifically, we prove that the germs at +∞ of Ltransexp-terms in a single variable are ordered, where Ltransexp is a language containing Lan(,) with new symbols for a transexponential function, its derivatives, and their compositional inverses.
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