The paper studies the regionally proximal relation of order d, RP[d], for minimal abelian dynamical systems (X, G).
The key results are:
For a minimal abelian dynamical system (X, G), the authors show that (x, y) is in RP[d] if and only if there exists a sequence {gn} in Gd and points zε in X for each ε in {0, 1}d{0} such that the limits limn→∞(gn·ε)x = zε and limn→∞(gn·ε)−1z1 = z1-ε hold. This extends Veech's characterization of the classical regionally proximal relation RP = RP[1] to higher orders.
The authors illustrate the cases for d = 1, 2, and 3 to provide intuition for the general result.
The proof for the necessity part is quite technical, involving the construction of carefully chosen sequences in Gd and leveraging properties of the dynamical cubespaces and the lifting property of RP[d].
The results establish a connection between the regionally proximal relations of higher order and the structure of minimal abelian dynamical systems, generalizing earlier work on the classical regionally proximal relation.
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arxiv.org
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by Jiahao Qiu, ... о arxiv.org 10-03-2024
https://arxiv.org/pdf/2410.01663.pdfГлибші Запити