Integral points in two-parameter orbits

Abstract

Let K be a number field, let f: P1 --> P1 be a nonconstant rational map of degree greater than 1, let S be a finite set of places of K, and suppose that u, w in P1(K) are not preperiodic under f. We prove that the set of (m,n) in N2 such that fm(u) is S-integral relative to fn(w) is finite and effectively computable. This may be thought of as a two-parameter analog of a result of Silverman on integral points in orbits of rational maps. This issue can be translated in terms of integral points on an open subset of P12; then one can apply a modern version of the method of Runge, after increasing the number of components at infinity by iterating the rational map. Alternatively, an ineffective result comes from a well-known theorem of Vojta.