Primitive prime divisors in the critical orbits of one-parameter families of rational polynomials

Abstract

For a rational polynomial f and rational numbers c, u, we put fc(x):=f(x)+c, and consider the Zsigmondy set Z(fc,u) associated to the sequence \fcn(u)-u\n≥ 0, where fcn is the n-st iteration of fc. In this paper, we prove that if u is a rational critical point of f, then there exists an Mf>0 such that Mf≥ c∈ Q\\#Z(fc,u)\.