Cycles for rational maps over global function fields with one prime of bad reduction

Abstract

Let K be a global function field of characteristic p and degree D over Fp(t). We consider dynamical systems over the projective line P1(K) defined by rational maps with at most one prime of bad reduction. The main result is an optimal bound for cycle lengths that only depends on p and D. A bound for the cardinality of finite orbits is given as well. Our method is based on a careful analysis (for every prime of good reduction) of the p-adic distances between points belonging to the same finite orbit, in part motivated by previous work by Canci and Paladino. Valuable insight is provided by a certain family of polynomials. In this case we also gain a good deal of information about the structure and size of the set of periodic points for polynomials of given degree.