On three equivalences concerning Ponomarev-systems

Ge, Ying. "On three equivalences concerning Ponomarev-systems." Archivum Mathematicum 042.3 (2006): 239-246. <http://eudml.org/doc/249820>.

@article{Ge2006,
abstract = {Let $\lbrace \{\mathcal \{P\}\}_n\rbrace $ be a sequence of covers of a space $X$ such that $\lbrace st(x,\{\mathcal \{P\}\}_n)\rbrace $ is a network at $x$ in $X$ for each $x\in X$. For each $n\in \mathbb \{N\}$, let $\{\mathcal \{P\}\}_n=\lbrace P_\{\beta \}:\beta \in \Lambda _n\rbrace $ and $\Lambda _ n$ be endowed the discrete topology. Put $M=\lbrace b=(\beta _n)\in \Pi _\{n\in \mathbb \{N\}\}\Lambda _ n: \lbrace P_\{\beta _n\}\rbrace $ forms a network at some point $x_b\ in \ X\rbrace $ and $f:M\longrightarrow X$ by choosing $f(b)=x_b$ for each $b\in M$. In this paper, we prove that $f$ is a sequentially-quotient (resp. sequence-covering, compact-covering) mapping if and only if each $\mathcal \{P\}_n$ is a $cs^*$-cover (resp. $fcs$-cover, $cfp$-cover) of $X$. As a consequence of this result, we prove that $f$ is a sequentially-quotient, $s$-mapping if and only if it is a sequence-covering, $s$-mapping, where “$s$” can not be omitted.},
author = {Ge, Ying},
journal = {Archivum Mathematicum},
keywords = {Ponomarev-system; point-star network; $cs^*$-(resp. $fcs$-; $cfp$-)cover; sequentially-quotient (resp. sequence-covering; compact-covering) mapping; Ponomarev-system; point-star network},
language = {eng},
number = {3},
pages = {239-246},
publisher = {Department of Mathematics, Faculty of Science of Masaryk University, Brno},
title = {On three equivalences concerning Ponomarev-systems},
url = {http://eudml.org/doc/249820},
volume = {042},
year = {2006},
}

TY - JOUR
AU - Ge, Ying
TI - On three equivalences concerning Ponomarev-systems
JO - Archivum Mathematicum
PY - 2006
PB - Department of Mathematics, Faculty of Science of Masaryk University, Brno
VL - 042
IS - 3
SP - 239
EP - 246
AB - Let $\lbrace {\mathcal {P}}_n\rbrace $ be a sequence of covers of a space $X$ such that $\lbrace st(x,{\mathcal {P}}_n)\rbrace $ is a network at $x$ in $X$ for each $x\in X$. For each $n\in \mathbb {N}$, let ${\mathcal {P}}_n=\lbrace P_{\beta }:\beta \in \Lambda _n\rbrace $ and $\Lambda _ n$ be endowed the discrete topology. Put $M=\lbrace b=(\beta _n)\in \Pi _{n\in \mathbb {N}}\Lambda _ n: \lbrace P_{\beta _n}\rbrace $ forms a network at some point $x_b\ in \ X\rbrace $ and $f:M\longrightarrow X$ by choosing $f(b)=x_b$ for each $b\in M$. In this paper, we prove that $f$ is a sequentially-quotient (resp. sequence-covering, compact-covering) mapping if and only if each $\mathcal {P}_n$ is a $cs^*$-cover (resp. $fcs$-cover, $cfp$-cover) of $X$. As a consequence of this result, we prove that $f$ is a sequentially-quotient, $s$-mapping if and only if it is a sequence-covering, $s$-mapping, where “$s$” can not be omitted.
LA - eng
KW - Ponomarev-system; point-star network; $cs^*$-(resp. $fcs$-; $cfp$-)cover; sequentially-quotient (resp. sequence-covering; compact-covering) mapping; Ponomarev-system; point-star network
UR - http://eudml.org/doc/249820
ER -