On r-primitive k-normal polynomials with two prescribed coefficients
Abstract
This article investigates the existence of an r-primitive k-normal polynomial, defined as the minimal polynomial of an r-primitive k-normal element in Fqn, with a specified degree n and two given coefficients over the finite field Fq. Here, q represents an odd prime power, and n 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 2-primitive 2-normal polynomial of degree n always exists over Fq when both q≥ 11 and n≥ 15. However, for the range 10≤ n≤ 14, uncertainty remains regarding the existence of such a polynomial for 71 specific pairs of (q,n). Moreover, when q<11, the number of uncertain pairs reduces to 16. Furthermore, for the case of n=9, extensive computational power is employed using SageMath software, and it is found that the count of such uncertain pairs is reduced to 3988.
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