Irreducibility of iterates of post-critically finite quadratic polynomials over Q

Abstract

In this paper, we classify, up to three possible exceptions, all monic, post-critically finite quadratic polynomials f(x)∈ Z[x] with an iterate reducible module every prime, but all of whose iterates are irreducible over Q. In particular, we obtain infinitely many new examples of the phenomenon studied in Jones. While doing this, we also find, up to three possible exceptions, all integers a such that all iterates of the quadratic polynomial (x+a)2-a-1 are irreducible over Q, which answers a question posed in AyadMcdonald, except for three values of a. Finally, we make a conjecture that suggests a necessary and sufficient condition for the stability of any monic, post-critically finite quadratic polynomial over any field of characteristic ≠ 2.