An application of "Selmer group Chabauty" to arithmetic dynamics

Abstract

We describe how one can use the "Selmer group Chabauty" method developed by the author to show that certain hyperelliptic curves of the form C y2 = xN + h(x)2 \,, where N = 2g + 1 is odd, h ∈ Z[x] with deg h g and h(0) odd, have only the "obvious" rational points ∞ (the unique point at infinity on the smooth projective model of the curve) and (0, h(0)). As an application of the method, we prove the following result. Let c ∈ Q and write fc(x) = x2 + c. We denote the iterates of fc by fc n; i.e., we set fc 0(x) = x and fc(n+1)(x) = fc(fc n(x)). If fc 2 is irreducible, then fc 6 is also irreducible. Assuming the Generalized Riemann Hypothesis (GRH), it also follows that fc 10 is irreducible.