Author:
Lehmer D. H.,Lehmer Emma,Mills W. H.
Abstract
Until recently none of the numerous papers on the distribution of quadratic and higher power residues was concerned with questions of the following sort: Let k and m be positive integers. According to a theorem of Brauer (1), for every sufficiently large prime p there exist m consecutive positive integers r, r + 1 , . . . , r + m — 1, each of which is a kth power residue of p. Let r(k, m, p) denote the least such r.
Publisher
Canadian Mathematical Society
Cited by
20 articles.
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1. On a theorem of Hildebrand;Moscow Journal of Combinatorics and Number Theory;2019-05-20
2. The Twenties;Springer Monographs in Mathematics;2012
3. None of the Above;Unsolved Problems in Number Theory;2004
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5. On consecutivek'th power residues;Monatshefte f�r Mathematik;1986-06