Valuation theory of exponential Hardy fields I ∗ Franz - Viktor and Salma Kuhlmann

Valuation bases for generalized algebraic series fields

a r t i c l e i n f o a b s t r a c t Keywords: Valuation independence Generalized series fields Fields of Puiseux series Restricted exponential function We investigate valued fields which admit a valuation basis. Given a countable ordered abelian group G and a real closed or algebraically closed field F with subfield K , we give a sufficient condition for a valued subfield of the field of gene...

On the Structure of Nonarchimedean Exponential Elds Ii Franz{viktor and Salma Kuhlmann

Exponentiation in Power Series Fields

We prove that for no nontrivial ordered abelian group G, the ordered power series field R((G)) admits an exponential, i.e. an isomorphism between its ordered additive group and its ordered multiplicative group of positive elements, but that there is a nonsurjective logarithm. For an arbitrary ordered field k, no exponential on k((G)) is compatible, that is, induces an exponential on k through t...

Valuation theory of exponential Hardy fields I

In this paper, we analyze the structure of the Hardy fields associated with o-minimal expansions of the reals with exponential function. In fact, we work in the following more general setting. We take T to be the theory of a polynomially bounded o-minimal expansion P of the ordered field of real numbers. By FT we denote the set of all 0-definable functions of P . Further, we assume that T defin...

Valuation theory of exponential