Littlewood polynomials with small \(L^4\) norm
From MaRDI portal
Publication:390996
DOI10.1016/j.aim.2013.03.015zbMath1291.30027arXiv1205.0260OpenAlexW2964133123MaRDI QIDQ390996
Daniel J. Katz, Kai-Uwe Schmidt, Jonathan Jedwab
Publication date: 9 January 2014
Published in: Advances in Mathematics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1205.0260
Shift register sequences and sequences over finite alphabets in information and communication theory (94A55) Polynomials and rational functions of one complex variable (30C10)
Related Items (8)
Improved lower bound for the Mahler measure of the Fekete polynomials ⋮ Sequences with small correlation ⋮ Recent Progress in the Study of Polynomials with Constrained Coefficients ⋮ On a problem due to Littlewood concerning polynomials with unimodular coefficients ⋮ On Newman and Littlewood polynomials with a prescribed number of zeros inside the unit disk ⋮ Merit factors of polynomials derived from difference sets ⋮ The asymptotic distance between an ultraflat unimodular polynomial and its conjugate reciprocal ⋮ Sums of monomials with large Mahler measure
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Computational excursions in analysis and number theory
- Some unsolved problems
- Zeros of Fekete polynomials
- Two binary sequence families with large merit factor
- The expected $L_{p}$ norm of random polynomials
- Merit Factors of Polynomials Formed by Jacobi Symbols
- Explicit merit factor formulae for Fekete and Turyn polynomials
- Some Theorems on Fourier Coefficients
- Norms of Polynomials
- An inequality for the maximum of trigonometric polynomials
- The merit factor of Legendre sequences (Corresp.)
- The merit factor of binary sequences related to difference sets
- Binary Sequences With Merit Factor Greater Than<tex>$6.34$</tex>
- Determination of the merit factor of Legendre sequences
- Sur Les Polynomes a Coefficients Unimodulaires
- The determination of Gauss sums
- Flat Polynomials on the unit Circle-Note on a Problem of Littlewood
- An exponential polynomial formed with the Legendre symbol
- An extremal property of Fekete polynomials
- Merit Factors of Character Polynomials
- On Polynomials ∑±nzm,∑eαminzm,z=e0i
- The L 4 Norm of a Polynomial with Coefficients ± 1
- On Some Exponential Sums
- Applied Algebra, Algebraic Algorithms and Error-Correcting Codes
This page was built for publication: Littlewood polynomials with small \(L^4\) norm
