Almost Periodic Functions: Their Limit Sets and Various Applications

IF 0.6 4区 数学 Q3 MATHEMATICS
Lev Sakhnovich
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引用次数: 0

Abstract

In the present paper, we introduce and study the limit sets of the almost periodic functions f: \({{\mathbb {R}}}\rightarrow {{\mathbb {C}}}\). It is interesting, that \(r=\inf |f(x)|\) and \(R=\sup |f(x)|\) may be expressed in exact form. In particular, the formula for r coincides with the well known partition problem formula. We show that the ring \(r\le |z|\le R\) is the limit set of the almost periodic function f(x) (under some natural conditions on f). We obtain interesting applications to the partition problem in number theory and to trigonometric series theory. We extend classical results for periodic functions (estimation of Fourier coefficients and Bernstein’s theorem about absolute convergence of trigonometric series) to almost periodic functions. Using our results on almost periodic functions, we propose a new approach to interesting problems of the stability of motion. An application of our function theoretic results to the spectral problems in operator theory is studied as well. The results and corresponding computations are illustrated by several figures.

Abstract Image

几乎周期函数:它们的极限集和各种应用
在本文中,我们将介绍并研究几乎周期性函数 f. 的极限集:\({{\mathbb {R}}}\rightarrow {{\mathbb {C}}}\).有趣的是\(r=\inf |f(x)|\)和\(R=\sup |f(x)|\)可以用精确形式表示。特别是,r 的公式与众所周知的分割问题公式重合。我们证明了环\(r\le |z|le R\) 是几乎周期函数 f(x) 的极限集(在 f 的一些自然条件下)。我们得到了数论中的分割问题和三角级数理论的有趣应用。我们将周期函数的经典结果(傅里叶系数估计和伯恩斯坦三角级数绝对收敛定理)扩展到了近周期函数。利用我们关于几乎周期函数的结果,我们提出了一种解决运动稳定性有趣问题的新方法。我们还研究了函数论结果在算子理论谱问题中的应用。我们用几幅图来说明这些结果和相应的计算。
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来源期刊
Computational Methods and Function Theory
Computational Methods and Function Theory MATHEMATICS, APPLIED-MATHEMATICS
CiteScore
3.20
自引率
0.00%
发文量
44
审稿时长
>12 weeks
期刊介绍: CMFT is an international mathematics journal which publishes carefully selected original research papers in complex analysis (in a broad sense), and on applications or computational methods related to complex analysis. Survey articles of high standard and current interest can be considered for publication as well.
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