Minimal fields of definition for Galois action

Abstract

Let K be a field, let G be a finite group, and let X→ Y be a G-Galois branched cover of varieties over Ksep. Given a mere cover model X→ Y of this cover over K, in Part I of this paper I observe that there is a unique minimal field E over which X→ Y becomes Galois, and I prove that E/K is Galois with group a subgroup of Aut(G). In Part II of this paper, by making the additional assumption that K is a field of definition (i.e., that there exists some Galois model over K), I am able to give an explicit description of the unique minimal field of Galois action for X→ Y. Namely, if there exists a K-rational point of X above an unramified point P∈ Y(K) then E is contained in the intersection of the specializations at P in the various different G-Galois models of X→ Y over K. Using the same proof mechanism, I observe a reverse version of "The Twisting Lemma", which asserts that the behavior of the K-rational points on the various mere cover models over K, and the behavior of the specializations on the various G-Galois models over K, are all governed by a single equivalence relation (independent of the model) on the K-rational points of the base variety.