Hilbert irreducibility for algebraic points

Abstract

We study the following problem: given a covering of curves ϕ X X0 over a number field k, and an integer d, when is the set \[\p ∈ X0(k)|\ deg\ p = d, and the fiber ϕ-1(p) is reducible over k(p)\\] finite? In case X itself admits infinitely many degree d points, we consider the modified problem where the images of degree d points on X are removed from the set. We prove a number of theorems ensuring a positive answer. As a consequence we show that for a fixed curve X and all sufficiently high-degree indecomposable rational functions ϕ:X P1 with b branch points, the set of reducible fibers above degree d<b/7-2 points, not containing a degree d point from X, is finite.