p-Adic interpolation of orbits under rational maps

Abstract

Let L be a field of characteristic zero, let h:P1 P1 be a rational map defined over L, and let c∈ P1(L). We show that there exists a finitely generated subfield K of L over which both c and h are defined along with an infinite set of inequivalent non-archimedean completions Kp for which there exists a positive integer a=a(p) with the property that for i∈ \0,… ,a-1\ there exists a power series gi(t)∈ Kp[[t]] that converges on the closed unit disc of Kp such that han+i(c)=gi(n) for all sufficiently large n. As a consequence we show that the dynamical Mordell-Lang conjecture holds for split self-maps (h,g) of P1 × X with g \'etale.