Revisiting Eisenstein-type criterion over integers

Abstract

The following result, a consequence of Dumas criterion for irreducibility of polynomials over integers, is generally proved using the notion of Newton diagram: Let f(x) be a polynomial with integer coefficients and k be a positive integer relatively prime to the degree of f(x). Suppose that there exists a prime number p such that the leading coefficient of f(x) is not divisible by p, all the remaining coefficients are divisible by pk, and the constant term of f(x) is not divisible by pk+1. Then f(x) is irreducible over Z. For k=1, this is precisely the Eisenstein criterion. The aim of this article is to give an alternate proof, accessible to the undergraduate students, of this result for k∈ \2,3,4\ using basic divisibility properties of integers.