Periodic points of rational functions over finite fields

Abstract

For q a prime power and φ a rational function with coefficients in Fq, let p(q,φ) be the proportion of P1(Fq) that is periodic with respect to φ. And if d is a positive integer, let Qd be the set of prime powers coprime to d! and let P(d,q) be the expected value of p(q,φ) as φ ranges over rational functions with coefficients in Fq of degree d. We prove that if d is a positive integer no less than 2, then P(d,q) tends to 0 as q increases in Qd. This theorem generalizes our previous work, which held only for quadratic polynomials, and only in fixed characteristic. To deduce this result, we prove a uniformity theorem on specializations of dynamical systems of rational functions with coefficients in certain finitely-generated algebras over residually finite Dedekind domains. This specialization theorem generalizes our previous work, which held only for algebras of dimension one.