T. Banakh, Szymon Glkab, Eliza Jablo'nska, J. Swaczyna
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引用次数: 5
Abstract
Generalizing Christensen's notion of a Haar-null set and Darji's notion of a Haar-meager set, we introduce and study the notion of a Haar-$\mathcal I$ set in a Polish group. Here $\mathcal I$ is an ideal of subsets of some compact metrizable space $K$. A Borel subset $B\subset X$ of a Polish group $X$ is called Haar-$\mathcal I$ if there exists a continuous map $f:K\to X$ such that $f^{-1}(B+x)\in\mathcal I$ for all $x\in X$. Moreover, $B$ is generically Haar-$\mathcal I$ if the set of witness functions $\{f\in C(K,X):\forall x\in X\;\;f^{-1}(B+x)\in\mathcal I\}$ is comeager in the function space $C(K,X)$. We study (generically) Haar-$\mathcal I$ sets in Polish groups for many concrete and abstract ideals $\mathcal I$, and construct the corresponding distinguishing examples. Also we establish various Steinhaus properties of the families of (generically) Haar-$\mathcal I$ sets in Polish groups for various ideals $\mathcal I$.
推广了Christensen的Haar空集概念和Darji的Haar贫集概念,引入并研究了波兰群中Haar-$\mathcalI$集的概念。这里$\mathcal I$是某个紧致可度量空间$K$的子集的理想。波兰群$X$的Borel子集$B\子集X$称为Haar-$\mathcal I$,如果存在到X$的连续映射$f:K\,使得对于X$中的所有$X\,$f^{-1}(B+X)\in\mathcal I$。此外,如果C(K,X)中的见证函数$\{f\:\ for all X\ in X\;\;f^{-1}(B+X)\ in \mathcal I\}$的集合在函数空间$C(K,X)$中是comeager,则$B$一般是Haar-$\mathcal I$。我们(一般地)研究了波兰群中许多具体和抽象理想$\mathcal I$的Haar-$\mathical I$集,并构造了相应的区别例子。此外,我们还为各种理想$\mathcalI$建立了波兰群中(一般)Haar-$\mathcal I$集合族的各种Steinhaus性质。
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DISSERTATIONES MATHEMATICAE publishes long research papers (preferably 50-100 pages) in any area of mathematics. An important feature of papers accepted for publication should be their utility for a broad readership of specialists in the domain. In particular, the papers should be to some reasonable extent self-contained. The paper version is considered as primary.
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