论有限布拉什克乘积幂的傅里叶系数

IF 0.9 2区数学 Q2 MATHEMATICS

International Mathematics Research Notices Pub Date : 2024-09-17 DOI:10.1093/imrn/rnae199

Alexander Borichev, Karine Fouchet, Rachid Zarouf

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引用次数: 0

摘要

给定一个有限的布拉什克乘积$B$，当$n$趋向于$\infty $时，我们证明了关于$B^{n}$的傅里叶系数序列的$\ell ^\infty }$正则的渐近尖锐估计值。对于某个$N\ge 3$，该正则衰减为$n^{-1/N}$。此外，对于每一个 $N\ge 3$，我们都能明确地得到一个衰减为 $n^{-1/N}$ 的有限布拉斯克乘积 $B$。作为应用，我们构造了一个 $n/times n$ 的可反矩阵 $T$ 序列，它在单位盘中具有任意频谱，并且使得数量 $|\det{T}|\cdot \|T^{-1}\|\cdot \|T\|^{1-n}$ 以 $n$ 的幂级数增长。这是由 Schäffer 提出的关于反转规范的问题引起的。

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On the Fourier Coefficients of Powers of a Finite Blaschke Product

Given a finite Blaschke product $B$ we prove asymptotically sharp estimates on the $\ell ^{\infty }$-norm of the sequence of the Fourier coefficients of $B^{n}$ as $n$ tends to $\infty $. This norm decays as $n^{-1/N}$ for some $N\ge 3$. Furthermore, for every $N\ge 3$, we produce explicitly a finite Blaschke product $B$ with decay $n^{-1/N}$. As an application we construct a sequence of $n\times n$ invertible matrices $T$ with arbitrary spectrum in the unit disk and such that the quantity $|\det{T}|\cdot \|T^{-1}\|\cdot \|T\|^{1-n}$ grows as a power of $n$. This is motivated by Schäffer’s question on norms of inverses.

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来源期刊

International Mathematics Research Notices 数学-数学

CiteScore

2.00

自引率

10.00%

发文量

316

审稿时长

1 months

期刊介绍： International Mathematics Research Notices provides very fast publication of research articles of high current interest in all areas of mathematics. All articles are fully refereed and are judged by their contribution to advancing the state of the science of mathematics.