On projections of products of spaces

Pub Date : 2021-09-01 DOI:10.35634/vm210304

A. Gryzlov

引用次数: 0

Abstract

We consider dense sets of products of topological spaces. We prove that in the product $Z^c=\prod\limits_{\alpha\in 2^\omega} Z_{\alpha},$ where $Z_\alpha=Z$ $(\alpha\in 2^\omega),$ there are dense sets such that their countable subsets have projections with additional properties. These properties entail that these dense sets contain no convergent sequences. By these properties we prove that the character of closed sets of the product is uncountable.

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关于空间乘积的投影

我们考虑拓扑空间积的稠密集。我们证明了在乘积$Z^c=\prod\limits_{\alpha\in 2^\omega} Z_{\alpha},$中，其中$Z_\alpha=Z$$(\alpha\in 2^\omega),$存在稠密集，使得它们的可数子集具有具有附加性质的投影。这些性质决定了这些密集集不包含收敛序列。利用这些性质证明了积的闭集的性质是不可数的。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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