A generalization of Littlewood's Lα flat theorem, α>0

Abstract

We establish a generalization of Littlewood's criterion on Lα-flatness by proving that there is no Lα-flat polynomials, α>0, within the class of analytic polynomials on the unit circle of the form Pn(z)=Σm=1ncm zm, n ∈ N*, satisfying Σm=1n|cm|2 ≤ Kn2 Σm=1nm2 |cm|2, where K is an absolutely constant. As a consequence, we confirm the Lα-Littlewood conjecture, and thereby the L1-Newman and L∞-Erd\"os conjectures. Our approach combines the Lα Littlewood theorem with the generalized Clarkson's second inequality for Lα(X,A,m;B), with B a Banach spaces and 1 < α ≤ 2. It follows that there are only finitely many Barker sequences, and we further present several applications in number theory and the spectral theory of dynamical systems. Finally, we construct Gauss-Fresnel polynomials that are Mahler-flat, providing a new proof of the Beller-Newman theorem.