Some subgroups of a finite field and their applications for obtaining explicit factors

Abstract

Let Sq denote the group of all square elements in the multiplicative group Fq* of a finite field Fq of odd characteristic containing q elements. Let Oq be the set of all odd order elements of Fq*. Then Oq turns up as a subgroup of Sq. In this paper, we show that Oq=4 if q=2t+1 and, Oq= t if q=4t+1, where q and t are odd primes. This paper also gives a direct method for obtaining the coefficients of irreducible factors of x2nt-1 in Fq[x] using the information of generator elements of Sq and Oq, when q and t are odd primes such that q=2t+1 or q=4t+1.