Transcendental extensions of a valuation domain of rank one

Abstract

Let V be a valuation domain of rank one and quotient field K. Let K be a fixed algebraic closure of the v-adic completion K of K and let V be the integral closure of V in K. We describe a relevant class of valuation domains W of the field of rational functions K(X) which lie over V, which are indexed by the elements α∈K\∞\, namely, W=Wα=\∈ K(X) (α)∈V\. If V is discrete and π∈ V is a uniformizer, then a valuation domain W of K(X) is of this form if and only if the residue field degree [W/M:V/P] is finite and π W=Me, for some e≥ 1, where M is the maximal ideal of W. In general, for α,β∈K we have Wα=Wβ if and only if α and β are conjugated over K. Finally, we show that the set P irr of irreducible polynomials over K endowed with an ultrametric distance introduced by Krasner is homeomorphic to the space \Wα α∈K\ endowed with the Zariski topology.