TY - JOUR
T1 - Almost sure convergence of the L4 norm of Littlewood polynomials
AU - Duan, Yongjiang
AU - Fang, Xiang
AU - Zhan, Na
N1 - Publisher Copyright:
© The Author(s), 2024.
PY - 2024/9/1
Y1 - 2024/9/1
N2 - This paper concerns the norm of Littlewood polynomials on the unit circle which are given by (formula presented) i.e., they have random coefficients in {-1,1}. Let (formula presented) We show that (formula presented) almost surely as n → ∞. This improves a result of Borwein and Lockhart (2001, Proceedings of the American Mathematical Society 129, 1463-1472), who proved the corresponding convergence in probability. Computer-generated numerical evidence for the a.s. convergence has been provided by Robinson (1997, Polynomials with plus or minus one coefficients: growth properties on the unit circle, M.Sc. thesis, Simon Fraser University). We indeed present two proofs of the main result. The second proof extends to cases where we only need to assume a fourth moment condition.
AB - This paper concerns the norm of Littlewood polynomials on the unit circle which are given by (formula presented) i.e., they have random coefficients in {-1,1}. Let (formula presented) We show that (formula presented) almost surely as n → ∞. This improves a result of Borwein and Lockhart (2001, Proceedings of the American Mathematical Society 129, 1463-1472), who proved the corresponding convergence in probability. Computer-generated numerical evidence for the a.s. convergence has been provided by Robinson (1997, Polynomials with plus or minus one coefficients: growth properties on the unit circle, M.Sc. thesis, Simon Fraser University). We indeed present two proofs of the main result. The second proof extends to cases where we only need to assume a fourth moment condition.
KW - almost sure convergence
KW - L norm
KW - Littlewood polynomial
KW - Serfling's maximal inequality
UR - http://www.scopus.com/inward/record.url?scp=85187974302&partnerID=8YFLogxK
U2 - 10.4153/S0008439524000213
DO - 10.4153/S0008439524000213
M3 - Article
AN - SCOPUS:85187974302
SN - 0008-4395
VL - 67
SP - 872
EP - 885
JO - Canadian Mathematical Bulletin
JF - Canadian Mathematical Bulletin
IS - 3
ER -