Number Fields in Fibers: the Geometrically Abelian Case with Rational Critical Values

Abstract

Let X be an algebraic curve over Q and t a non-constant Q-rational function on X such that Q(t) is a proper subfield of Q(X). For every integer n pick a point Pn on X such that t(Pn)=n. We conjecture that, for large N, among the number fields Q(P1), ..., Q(PN) there are at least cN distinct. We prove this conjecture in the special case when t defines a geometrically abelian covering of the projective line, and the critical values of t are all rational. This implies, in particular, that our conjecture follows from a famous conjecture of Schinzel.