四川大学学报(自然科学版)2024,Vol.61Issue(2):23-28,6.DOI:10.19907/j.0490-6756.2024.021003
形式幂级数∏∞n=0(1-x2n)m系数的无界性
On the unboundedness of the coefficients of power series ∏∞n=0(1-x2n)m
摘要
Abstract
Let ∏∞n=0(1-x2n)be the generating function of the Prouhet-Thue-Morse sequence.Let Fm(x)=(F(x))m=(∏∞n=0(1-x2n))m≔∑∞n=0tm(n)xn.In 2018,Gawron,Miska and Ulas proposed a conjecture on the unboundedness of the sequence{tm(n)}∞n=1 for m≥2.They also proved this conjecture for m=3 and m=2k by studying the 2-adic of tm(n),where k is a positive integer.In this paper,we intro-duce a new method for this conjecture.In this method,a class of anti-centrosymmetric matrices are firstly ob-tained by studying the recursive relation of tm(n).Then the conjecture may be proved by calculating the ei-genvalues of the matrices.In particular,we prove the conjecture for m=5 and 6 by presenting unbounded sub-sequences of{t5(n)}∞n=1 and{t6(n)}∞n=1.Meanwhile,we also partially prove another conjecture on the 2-adic values of t5(n)by calculating the 2-adic value of a sub-sequence of{t5(n)}∞n=1.关键词
Prouhet-Thue-Morse 序列/无界性/特征值Key words
Prouhet-Thue-Morse sequence/Unboundedness/Eigenvalue分类
数理科学引用本文复制引用
朱朝熹,赵伟..形式幂级数∏∞n=0(1-x2n)m系数的无界性[J].四川大学学报(自然科学版),2024,61(2):23-28,6.基金项目
保密通信重点实验室基金资助(61421030111012101) (61421030111012101)
