On characterization of prime divisors of the index of a quadrinomial

Abstract

Let θ be an algebraic integer and f(x)=xn+axn-1+bx+c be the minimal polynomial of θ over the rationals. Let K=Q(θ) be a number field and OK be the ring of integers of K. In this article, we characterize all the prime divisors of the discriminant of f(x) which do not divide the index of f(x). As a fascinating corollary, we deduce necessary and sufficient conditions for the monogenity of the field K=Q(θ), where θ is associated with certain quadrinomials.