Algebraic curves A l(x)-U(y)=0 and arithmetic of orbits of rational functions

Abstract

We give a description of pairs of complex rational functions A and U of degree at least two such that for every d≥ 1 the algebraic curve A d(x)-U(y)=0 has a factor of genus zero or one. In particular, we show that if A is not a `generalized Latt\`es map', then this condition is satisfied if and only if there exists a rational function V such that U V=A l for some l≥ 1. We also prove a version of the dynamical Mordell-Lang conjecture, concerning intersections of orbits of points from P1(K) under iterates of A with the value set U( P1(K)), where A and U are rational functions defined over a number field K.