On the size of primitive sets in function fields

Abstract

A set is primitive if no element of the set divides another. We consider primitive sets of monic polynomials over a finite field and find natural generalizations of many of the results known for primitive sets of integers. In particular we generalize a result of Besicovitch to show that there exist primitive sets in Fq[x] with upper density arbitrarily close to q - 1q. Then, for a primitive set A, we consider the sum Σa ∈ A 1q a a, the natural analogue in this setting of a sum considered by Erdos for primitive subsets of the integers, and show that it is uniformly bounded over all primitive sets A. We end with a generalization of work of Martin and Pomerance on the asymptotic growth rate of the counting function of a primitive set. Along the way we prove a quantitative analogue of the Hardy-Ramanujan theorem for function fields, as well as bounds on the size of the k-th irreducible polynomial.