An extension of a second irreducibility theorem of I. Schur

Abstract

Let n ≠ 8 be a positive integer such that n+1 ≠ 2u for any integer u≥ 2. Let φ(x) belonging to Z[x] be a monic polynomial which is irreducible modulo all primes less than or equal to n+1. Let aj(x) with 0≤ j≤ n-1 belonging to Z[x] be polynomials having degree less than φ(x). Assume that the content of (ana0(x)) is not divisible by any prime less than or equal to n+1. In this paper, we prove that the polynomial f(x) = anφ(x)n(n+1)!+ Σj=0n-1aj(x)φ(x)j(j+1)! is irreducible over the field Q of rational numbers. This generalises a well-known result of Schur which states that the polynomial Σj=0najxj(j+1)! with aj ∈ Z and |a0| = |an| = 1 is irreducible over Q. We illustrate our result through examples.