Do flat skew-reciprocal Littlewood polynomials exist?

Abstract

Polynomials with coefficients in \-1,1\ are called Littlewood polynomials. Using special properties of the Rudin-Shapiro polynomials and classical results in approximation theory such as Jackson's Theorem, de la Vall\'ee Poussin sums, Bernstein's inequality, Riesz's Lemma, divided differences, etc., we give a significantly simplified proof of a recent breakthrough result by Balister, Bollob\'as, Morris, Sahasrabudhe, and Tiba stating that there exist absolute constants η2 > η1 > 0 and a sequence (Pn) of Littlewood polynomials Pn of degree n such that η1 n ≤ |Pn(z)| ≤ η2 n\,, z ∈ C\,, \, \, |z| = 1,, confirming a conjecture of Littlewood from 1966. Moreover, the existence of a sequence (Pn) of Littlewood polynomials Pn is shown in a way that in addition to the above flatness properties a certain symmetry is satisfied by the coefficients of Pn making the Littlewood polynomials Pn close to skew-reciprocal.