On $r$-primitive $k$-normal polynomials with two prescribed coefficients
Abstract
This article investigates the existence of an -primitive -normal polynomial, defined as the minimal polynomial of an -primitive -normal element in , with a specified degree and two given coefficients over the finite field . Here, represents an odd prime power, and is an integer. The article establishes a sufficient condition to ensure the existence of such a polynomial. Using this condition, it is demonstrated that a -primitive -normal polynomial of degree always exists over when both and . However, for the range , uncertainty remains regarding the existence of such a polynomial for specific pairs of . Moreover, when , the number of uncertain pairs reduces to . Furthermore, for the case of , extensive computational power is employed using SageMath software, and it is found that the count of such uncertain pairs is reduced to .
Cite
@article{arxiv.2405.20760,
title = {On $r$-primitive $k$-normal polynomials with two prescribed coefficients},
author = {Avnish K. Sharma and Mamta Rani and Sharwan K. Tiwari and Anupama Panigrahi},
journal= {arXiv preprint arXiv:2405.20760},
year = {2024}
}
Comments
27 pages, 3 Tables