On the discriminant and index of a certain class of polynomials

Abstract

Let f(x) = (x2+1)n - a xn ∈ Z[x] and assume f(x) is irreducible. Let θ be a root of f(x), set K= Q(θ), and denote by ZK the ring of integers of K. The index of f, denoted ind(f), is the index of Z[θ] in ZK. A polynomial f(x) is said to be monogenic if ind(f) = 1. In this article, we explicitly compute the discriminant of the polynomial f(x), and then derive necessary and sufficient conditions on the parameters a and n for f(x) to be monogenic. Furthermore, we provide a complete description of the primes that divide ind(f).