Algorithmic aspects of Newman polynomials and their divisors

Abstract

We study the problem of determining which integer polynomials divide Newman polynomials. In this vein, we first give results concerning the 8438 known polynomials with Mahler measure less than 1.3. We then exhibit a list of polynomials that divide no Newman polynomial. In particular, we show that a degree-10 polynomial of Mahler measure approximately 1.419404632 divides no Newman polynomial, thereby improving the best known upper bound for any universal constant σ, if it exists, such that every integer polynomial of Mahler measure less than σ divides a Newman polynomial. Finally, letting l(x) denote Lehmer's polynomial, we explicitly construct Newman polynomials divisible by l(x)2 with degrees up to 150, and show that no Newman polynomial is divisible by l(x)3 up to degree 160.