重访加权拓扑压力

Pub Date : 2024-05-08 DOI:10.1017/etds.2024.35
NIMA ALIBABAEI
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引用次数: 0

摘要

Feng and Huang [Variational principle for weighted topological pressure.J. Math.Pures Appl. (9)106 (2016),411-452] 引入了动态系统间因子映射的加权拓扑熵和压力,并建立了其变分原理。Tsukamoto [New approach to weighted topological entropy and pressure.Ergod.Th. & Dynam.Sys.43(2023),1004-1034] 对最简单情况下的这些不变式进行了完全不同的重新定义,并通过变分原理证明这两个定义是重合的。我们推广了塚本的方法,重新定义了更高维度的加权拓扑熵和压力,并证明了变分原理。我们的结果允许对仿射不变集的豪斯多夫维度进行基本计算,如自仿射海绵和驻留在任意维度欧几里得空间中的某些索菲克集。
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Weighted topological pressure revisited
Feng and Huang [Variational principle for weighted topological pressure. J. Math. Pures Appl. (9)106 (2016), 411–452] introduced weighted topological entropy and pressure for factor maps between dynamical systems and established its variational principle. Tsukamoto [New approach to weighted topological entropy and pressure. Ergod. Th. & Dynam. Sys.43 (2023), 1004–1034] redefined those invariants quite differently for the simplest case and showed via the variational principle that the two definitions coincide. We generalize Tsukamoto’s approach, redefine the weighted topological entropy and pressure for higher dimensions, and prove the variational principle. Our result allows for an elementary calculation of the Hausdorff dimension of affine-invariant sets such as self-affine sponges and certain sofic sets that reside in Euclidean space of arbitrary dimension.
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