Almost No Finite Subset of Integers Contains a qth Power Modulo Almost Every Prime

Abstract

Let q be a prime. We give an elementary proof of the fact that for any k∈N, the proportion of k-element subsets of Z that contain a qth power modulo almost every prime, is zero. This result holds regardless of whether the proportion is measured additively or multiplicatively. More specifically, the number of k-element subsets of [-N, N] that contain a qth power modulo almost every prime is no larger than aq,k Nk-(1-1q), for some positive constant aq,k. Furthermore, the number of k-element subsets of \ p1e1 p2e2 ·s pNeN : 0 ≤ e1, e2, …, eN≤ N\ that contain a qth power modulo almost every prime is no larger than mq,k NNkqN for some positive constant mq,k.