Orthogonal Bases of Exponential Functions for $$L^2(\mu )$$ on $$\mathbb {R}^d$$

Li-Xiang An, Xing-Gang He, Qian Li
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Abstract

A probability measure \(\mu \) on \({{\mathbb {R}}}^d\) with compact support is called a spectral measure if it possesses an exponential orthonormal basis for \(L^2(\mu )\). In this paper, we establish general criteria for determining whether a probability measure is spectral or not. As applications of these criteria, we provide a straightforward proof for the Lebesgue measure restricted to \([0, 1]^d\) or \([0, 1]\cup [a, a+1]\cup [b, b+1]\) to be a spectral measure. Furthermore, we investigate the spectrality of Cantor–Moran measure

$$\begin{aligned} \mu _{\{A_n, {{\mathcal {D}}}_n\}}= \delta _{A_1^{-1}{{\mathcal {D}}}_1}*\delta _{A_1^{-1}A_2^{-1}{{\mathcal {D}}}_2}*\delta _{A_1^{-1}A_2^{-1}A_3^{-1}{{\mathcal {D}}}_3}*\cdots \end{aligned}$$

generated by an admissible sequence \(\{(A_n,{{\mathcal {D}}}_n)\}_{n=1}^{\infty }\). It is noteworthy that our general criteria can be applied to establish numerous known and novel results.

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$$\mathbb {R}^d$$ 上 $$L^2(\mu )$$ 的指数函数正交基础
如果在({\mathbb {R}}^d\) 上具有紧凑支持的概率度量\(\mu \)拥有\(L^2(\mu )\)的指数正交基础,那么这个概率度量就被称为谱度量。在本文中,我们建立了判定概率度量是否为谱度量的一般标准。作为这些标准的应用,我们提供了一个直接的证明,即限制于 \([0, 1]^d\) 或 \([0, 1]\cup [a, a+1]\cup [b, b+1]\) 的 Lebesgue 度量是一个谱度。此外,我们还研究了康托-莫兰度量 $$\begin{aligned} 的谱性。\mu _\{{A_n、{{{mathcal {D}}}_n\}}= \delta _{A_1^{-1}{{\mathcal {D}}}_1}*\delta _{A_1^{-1}A_2^{-1}{{{\mathcal {D}}}_2}*\delta _{A_1^{-1}A_2^{-1}A_3^{-1}{{mathcal {D}}_3}*cdots (end{aligned}$$由可接受序列 \(\{(A_n、{{{mathcal {D}}}_n)\}_{n=1}^{\infty }\).值得注意的是,我们的一般标准可以用来建立许多已知的和新颖的结果。
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