修正下维的稳定性和可测性

R. Balka, Márton Elekes, V. Kiss
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引用次数: 0

摘要

较低的维度$\dim_L$是阿苏德维度的双重概念。由于它不是单调的,Fraser和Yu引入了修改后的下维$\dim_{ML}$,用简单公式$\dim_{ML} X=\sup\{\dim_L E: E\subset X\}$使下维单调。作为我们的第一个结果,我们证明了修正的下维在任何度量空间是有限稳定的,回答了Fraser和Yu的一个问题。我们证明了一个新的、简单的修正低维的表征。对于度量空间$X$,设$\mathcal{K}(X)$表示具有Hausdorff度量的$X$的非空紧子集的度量空间。作为我们的表征的一个应用,我们证明了地图$\dim_{ML} \colon \mathcal{K}(X)\to [0,\infty]$是Borel可测量的。更准确地说,它属于Baire类$2$,但一般不属于Baire类$1$。这就回答了Fraser和Yu的另一个问题。最后,我们证明了在具有Effros Borel结构的$\ell^1$闭集上定义的修正下维是不可Borel可测的。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Stability and measurability of the modified lower dimension
The lower dimension $\dim_L$ is the dual concept of the Assouad dimension. As it fails to be monotonic, Fraser and Yu introduced the modified lower dimension $\dim_{ML}$ by making the lower dimension monotonic with the simple formula $\dim_{ML} X=\sup\{\dim_L E: E\subset X\}$. As our first result we prove that the modified lower dimension is finitely stable in any metric space, answering a question of Fraser and Yu. We prove a new, simple characterization for the modified lower dimension. For a metric space $X$ let $\mathcal{K}(X)$ denote the metric space of the non-empty compact subsets of $X$ endowed with the Hausdorff metric. As an application of our characterization, we show that the map $\dim_{ML} \colon \mathcal{K}(X)\to [0,\infty]$ is Borel measurable. More precisely, it is of Baire class $2$, but in general not of Baire class $1$. This answers another question of Fraser and Yu. Finally, we prove that the modified lower dimension is not Borel measurable defined on the closed sets of $\ell^1$ endowed with the Effros Borel structure.
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