序列

Discovering Dynamical Systems Through Experiment and Inquiry Pub Date : 2021-02-02 DOI:10.1201/9781003024132-2

T. Lofaro, J. Ford

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引用次数: 0

摘要

．对于任意Banach空间中的有界序列，定义了弱和一致弱混合(到零)的概念。向量序列的均匀弱混合具有平均遍历收敛性。这一特征在多重递归的研究中被证明是有用的，在多重递归的研究中，矢量序列的混合性质，不是线性算子的轨道，被研究。对于满足一定支配条件的有界序列，证明了弱混合归零与均匀弱混合归零是等价的。

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Sequences

. Notions of weak and uniformly weak mixing (to zero) are deﬁned for bounded se- quences in arbitrary Banach spaces. Uniformly weak mixing for vector sequences is characterized by mean ergodic convergence properties. This characterization turns out to be useful in the study of multiple recurrence, where mixing properties of vector sequences, which are not orbits of linear operators, are investigated. For bounded sequences, which satisfy a certain domination condition, it is shown that weak mixing to zero is equivalent with uniformly weak mixing to zero.

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Discovering Dynamical Systems Through Experiment and Inquiry

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