Small prime kth power residues for k=2,3,4: A reciprocity laws approach

Abstract

Nagell proved that for each prime p 13, p > 7, there is a prime q<2p1/2 that is a cubic residue modulo p. Here we show that for each fixed ε > 0, and each prime p 13 with p > p0(ε), the number of prime cubic residues q < p1/2+ε exceeds pε/30. Our argument, like Nagell's, is rooted in the law of cubic reciprocity; somewhat surprisingly, character sum estimates play no role. We use the same method to establish related results about prime quadratic and biquadratic residues. For example, for all large primes p, there are more than p1/9 prime quadratic residues q<p.