Effective bounds on S-integral preperiodic points for polynomials

Abstract

Given a polynomial f defined over a number field K, we make effective certain special cases of a conjecture of S. Ih, on the finiteness of f-preperiodic points which are S-integral with respect to a fixed non-preperiodic point α. As an application, we obtain bounds on the number of S-units in the doubly indexed sequence \ fn(α) - fm(α) \n > m ≥ 0. In the case of a unicritical polynomial fc(z)=z2+c, with α fixed to be the critical point 0, for parameters c outside a small region, we give an explicit bound which depends only on the number of places of bad reduction for fc. As part of the proof, we obtain novel lower bounds for the v-adically smallest preperiodic point of fc for each place v of K.