Valuation theory of exponential Hardy fields II: Principal parts of germs in the Hardy field of o-minimal exponential expansions of the reals

Abstract

We present a general structure theorem for the Hardy field of an o-minimal expansion of the reals by restricted analytic functions and an unrestricted exponential. We proceed to analyze its residue fields with respect to arbitrary convex valuations, and deduce a power series expansion of exponential germs. We apply these results to cast "Hardy's conjecture" (see [p.111][KS]) in a more general framework. This paper is a follow up to [K-K2] and is partially based on unpublished results of [K-K]. A previous version [K-K1] (which was dedicated to Murray A. Marshall on his 60th birthday) remained unpublished. In [W] our structure theorem for the residue fields was rediscovered and applied to the diophantine context. Due to this revived interest, we decided to rework the preprint [K-K1] and submit it to the Proceedings Volume.