Arithmetic descent of specializations of Galois covers

Abstract

Given a G-Galois branched cover of the projective line over a number field K, we study whether there exists a closed point of P1K with a connected fiber such that the G-Galois field extension induced by specialization "arithmetically descends" to Q (i.e., there exists a G-Galois field extension of Q whose compositum with the residue field of the point is equal to the specialization). We prove that the answer is frequently positive (whenever G is regularly realizable over Q) if one first allows a base change to a finite extension of K. If one does not allow base change, we prove that the answer is positive when G is cyclic. Furthermore, we provide an explicit example of a Galois branched cover of P1K with no K-rational points of arithmetic descent.