A Clean Approach to Rational Cubic Residues
Number Theory
2007-06-11 v2
Abstract
In 1958 E. Lehmer found an explicit description of those primes p for which a given prime q is a cubic residue. In this paper we demonstrate that a similar result may be obtained for cubic nonresidues, yielding a cubic character for fixed p that provides an effective means for ascertaining whether or not an arbitrary integer c is a cubic residue modulo p. As an illustration of this technique, we determine whether 1982 is a cubic residue modulo the 131-digit prime p=(3^19+5^82)/4, a question which is essentially impossible to answer with Lehmer's original criterion.
Keywords
Cite
@article{arxiv.math/0611151,
title = {A Clean Approach to Rational Cubic Residues},
author = {Sam Vandervelde},
journal= {arXiv preprint arXiv:math/0611151},
year = {2007}
}
Comments
15 pages, submitted to International Journal of Number Theory, one paragraph appended to section five in v2