The distance to square-free polynomials

Abstract

In this paper, we consider a variant of Tur\'an's problem on the distance from an integer polynomial in Z[x] to the nea\-rest irreducible polynomial in Z[x]. We prove that for any polynomial f ∈ Z[x], there exist infinitely many square-free polynomials g∈ Z[x] such that L(f-g) 2, where L(f-g) denotes the sum of the absolute values of the coefficients of f-g. On the other hand, we show that this inequality cannot be replaced by L(f-g) 1. For this, for each integer d ≥ 16 we construct infinitely many polynomials f ∈ Z[x] of degree d such that neither f itself nor any f(x) xk, where k is a non-negative integer, is square-free. Polynomials over prime fields and their distances to square-free polynomials are also considered.