Non-parametricity of rational translates of regular Galois extensions

Abstract

We generalize a result of F.\ Legrand about the existence of non-parametric Galois extensions for a given group G. More precisely, for a K-regular Galois extension F|K(t), we consider the translates F(s)|K(s) by an extension K(s)|K(t) of rational function fields (in other words, s is a root of g(X)-t for some rational function g∈ K(X)). We then show that if F|K(t) is a K-regular Galois extension with group G over a number field K, then for any degree k 2 and almost all (in a density sense) rational functions g of degree k, the translate of F by a root field of g(X)-t over K(t) is non-G-parametric, i.e.\ not all Galois extensions of K with group G arise as specializations of F(s)|K(s).