Eventually stable quadratic polynomials over Q

Abstract

We study the number of irreducible factors (over Q) of the nth iterate of a polynomial of the form fr(x) = x2 + r for rational r. When the number of such factors is bounded independent of n, we call fr(x) eventually stable (over Q). Previous work of Hamblen, Jones, and Madhu shows that fr is eventually stable unless r has the form 1/c for some integer c ∈ \0,-1\, in which case existing methods break down. We study this family, and prove that several conditions on c of various flavors imply that all iterates of f1/c are irreducible. We give an algorithm that checks the latter property for all c up to a large bound B in time polynomial in B. We find all c-values for which the third iterate of f1/c has at least four irreducible factors, and all c-values such that f1/c is irreducible but its third iterate has at least three irreducible factors. This last result requires finding all rational points on a genus-2 hyperelliptic curve for which the method of Chabauty and Coleman does not apply; we use the more recent variant known as elliptic Chabauty. Finally, we apply all these results to completely determine the number of irreducible factors of any iterate of f1/c, for all c with absolute value at most 109.