MATHEMATICA BOHEMICA, Vol. 136, No. 3, pp. 287-299, 2011

A note on $\text k-c-$semistratifiable spaces and strong $\beta$-spaces

Li-Xia Wang, Liang-Xue Peng

Li-Xia Wang, Liang-Xue Peng, College of Applied Science, Beijing University of Technology, Beijing 100124, China, e-mail: wanglixia@emails.bjut.edu.cn, pengliangxue@bjut.edu.cn

Abstract: Recall that a space $X$ is a c-semistratifiable (CSS) space, if the compact sets of $X$ are $G_\delta$-sets in a uniform way. In this note, we introduce another class of spaces, denoting it by k-c-semistratifiable (k-CSS), which generalizes the concept of c-semistratifiable. We discuss some properties of k-c-semistratifiable spaces. We prove that a $T_2$-space $X$ is a k-c-semistratifiable space if and only if $X$ has a $g$ function which satisfies the following conditions: \item{(1)} For each $x\in X$, $\{ x\}=\bigcap\{g(x, n) n\in\mathbb{N}\}$ and $ g(x, n+1)\subseteq g(x, n)$ for each $n\in\mathbb{N}$. \item{(2)} If a sequence $\{x_n\}_{n\in\mathbb{N}}$ of $X$ converges to a point $x\in X$ and $y_n\in g(x_n, n)$ for each $n\in\mathbb{N}$, then for any convergent subsequence $\{y_{n_k}\}_{k\in\mathbb{N}}$ of $\{y_n\}_{n\in\mathbb{N}}$ we have that $\{y_{n_k}\}_{k\in\mathbb{N}}$ converges to $x$. By the above characterization, we show that if $X$ is a submesocompact locally k-c-semistratifiable space, then $X$ is a k-c-semistratifible space, and the countable product of k-c-semistratifiable spaces is a k-c-semistratifiable space. If $X=\bigcup\{ Int(X_n) n\in\mathbb{N}\}$ and $X_n$ is a closed k-c-semistratifiable space for each $n$, then $X$ is a k-c-semistratifiable space. In the last part of this note, we show that if $X=\bigcup\{X_n n\in\mathbb{N}\}$ and $X_n$ is a closed strong $\beta$-space for each $n\in\mathbb{N}$, then $X$ is a strong $\beta$-space.

Keywords: c-semistratifiable space, k-c-semistratifiable space, submesocompact space, $g$ function, strong $\beta$-space

Classification (MSC 2010): 54E20, 54D20


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