Consecutive Primitive Roots in a Finite Field. II
- 1 August 1985
- journal article
- Published by JSTOR in Proceedings of the American Mathematical Society
- Vol. 94 (4) , 605-611
- https://doi.org/10.2307/2044873
Abstract
The proof of the theorem that every finite field of order 3)$"> such that <!-- MATH $q\not\equiv 7(\mod 12)$ --> contains a pair of consecutive primitive roots is completed by consideration of the case in which <!-- MATH $q \equiv 1(\mod 60)$ --> .
Keywords
This publication has 5 references indexed in Scilit:
- Consecutive Primitive Roots in a Finite FieldProceedings of the American Mathematical Society, 1985
- Primitive Roots in the Quadratic Extension of a Finite FieldJournal of the London Mathematical Society, 1983
- Sums of gauss, jacobi, and jacobsthalJournal of Number Theory, 1979
- A note on the distribution of the primitive roots of a primeJournal of Number Theory, 1971
- Pairs of Consecutive Primitive Roots Modulo a PrimeProceedings of the American Mathematical Society, 1968