Dynamical Cancellation of Polynomials

Abstract

Extending the work of Bell, Matsuzawa and Satriano, we consider a finite set of polynomials S over a number field K and give a necessary and sufficient condition for the existence of a N ∈ N> 0 and a finite set Z ⊂ P1K × P1K such that for any (a,b) ∈ (P1K × P1K) Z we have the cancellation result: if k>N and φ1,… ,φk are maps in S such that φk … φ1 (a) = φk … φ1(b), then in fact φN … φ1(a) = φN … φ1(b). Moreover, the conditions we give for this cancellation result to hold can be checked by a finite number of computations from the given set of polynomials.