r-primitive k-normal polynomials over finite fields with last two coefficients prescribed

Abstract

Let ∈Fqm be an r-primitive k-normal element over Fq, where q is a prime power and m is a positive integer. The minimal polynomial of is referred to be the r-primitive k-normal polynomial of over Fq. In this article, we study the existence of an r-primitive k-normal polynomial over Fq such that the last two coefficients are prescribed. In this context, first, we prove a sufficient condition which guarantees the existence of such a polynomial. Further, we compute all possible exceptional pairs (q,m) in case of 3-primitive 1-normal polynomials for m≥ 7.