NIP for the Asymptotic Couple of the Field of Logarithmic Transseries

Abstract

The derivation on the differential-valued field T of logarithmic transseries induces on its value group a certain map . The structure = (,) is a divisible asymptotic couple. In~gehret we began a study of the first-order theory of (,) where, among other things, we proved that the theory T = Th(,) has a universal axiomatization, is model complete and admits elimination of quantifiers (QE) in a natural first-order language. In that paper we posed the question whether T has NIP (i.e., the Non-Independence Property). In this paper, we answer that question in the affirmative: T does have NIP. Our method of proof relies on a complete survey of the 1-types of T, which, in the presence of QE, is equivalent to a characterization of all simple extensions α of . We also show that T does not have the Steinitz exchange property and we weigh in on the relationship between models of T and the so-called precontraction groups of~kuhlmann1.