NewEvery arXiv paper, its researchers & institutions — mapped.
paper

The $k_{R}$-property of free Abelian topological groups and products of sequential fans

arXiv:1610.02522

Abstract

A space $X$ is called a $k_{R}$-space, if $X$ is Tychonoff and the necessary and sufficient condition for a real-valued function $f$ on $X$ to be continuous is that the restriction of $f$ to each compact subset is continuous. In this paper, we discuss the $k_{R}$-property of products of sequential fans and free Abelian topological groups by applying the $κ$-fan introduced by Banakh. In particular, we prove the following two results: (1) The space $S_{ω_{1}}\times S_{ω_{1}}$ is not a $k_{R}$-space. (2) The space $S_ω\times S_{ω_{1}}$ is a $k_{R}$-space if and only if $S_ω\times S_{ω_{1}}$ is a $k$-space if and only if $\mathfrak b>ω_1$. These results generalize some well-known results on sequential fans. Furthermore, we generalize some results of Yamada on the free Abelian topological groups by applying the above results. Finally, we pose some open questions about the $k_{R}$-spaces.

17pages. arXiv admin note: text overlap with arXiv:1602.04857 by other authors; text overlap with arXiv:1610.02523