范德科普特不等式的一个动态证明

IF 0.5 4区数学 Q4 MATHEMATICS, APPLIED

Dynamical Systems-An International Journal Pub Date : 2021-06-22 DOI:10.1080/14689367.2022.2100244

Nikolai Edeko, Henrik Kreidler, R. Nagel

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引用次数: 2

摘要

基于Furstenberg对应原理，我们给出了Hilbert空间中序列的van der Corput不等式的一个动力学证明。这是通过将不等式简化为希尔伯特空间上收缩的平均遍历定理来实现的。其中的关键困难在于，Furstenberg对应原理先验地局限于标量值序列。因此，我们讨论了如何通过代数的Gelfand–Naimark–Segal构造来解释Furstenberg对应原理，从而不仅可以用酉算子研究标量序列，还可以用酉算子研究一般希尔伯特空间值序列。这根据Furstenberg对应原理的精神给出了van der Corput不等式的一个证明，并通过对不等式的不同变体的新证明讨论了该方法的灵活性。

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A dynamical proof of the van der Corput inequality

We provide a dynamical proof of the van der Corput inequality for sequences in Hilbert spaces that is based on the Furstenberg correspondence principle. This is done by reducing the inequality to the mean ergodic theorem for contractions on Hilbert spaces. The key difficulty therein is that the Furstenberg correspondence principle is, a priori, limited to scalar-valued sequences. We, therefore, discuss how interpreting the Furstenberg correspondence principle via the Gelfand–Naimark–Segal construction for -algebras allows to study not just scalar but general Hilbert space-valued sequences in terms of unitary operators. This yields a proof of the van der Corput inequality in the spirit of the Furstenberg correspondence principle and the flexibility of this method is discussed via new proofs for different variants of the inequality.

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来源期刊

Dynamical Systems-An International Journal 物理-力学

CiteScore

0.90

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： Dynamical Systems: An International Journal is a world-leading journal acting as a forum for communication across all branches of modern dynamical systems, and especially as a platform to facilitate interaction between theory and applications. This journal publishes high quality research articles in the theory and applications of dynamical systems, especially (but not exclusively) nonlinear systems. Advances in the following topics are addressed by the journal: •Differential equations •Bifurcation theory •Hamiltonian and Lagrangian dynamics •Hyperbolic dynamics •Ergodic theory •Topological and smooth dynamics •Random dynamical systems •Applications in technology, engineering and natural and life sciences