Integral points of bounded degree on the projective line and in dynamical orbits

Abstract

Let D be a non-empty effective divisor on P1. We show that when ordered by height, any set of (D,S)-integral points on P1 of bounded degree has relative density zero. We then apply this to arithmetic dynamics: let (z)∈ Q(z) be a rational function of degree at least two whose second iterate 2(z) is not a polynomial. We show that as we vary over points P∈P1(Q) of bounded degree, the number of algebraic integers in the forward orbit of P is absolutely bounded and zero on average.