Detail publikace
Neighborhood spaces and convergence
ŠLAPAL, J. RICHMOND, T.
Český název
Neighborhood spaces and convergence
Anglický název
Neighborhood spaces and convergence
Typ
článek v časopise - ostatní, Jost
Jazyk
en
Originální abstrakt
We study neighborhood spaces $(X, \nu)$ in which the system $\nu(x)$ of neighborhoods at a point $x \in X$ is a system of subsets of$X$ containing $x$ which need not be a filter, but must only be astack, i.e., closed under the formation of supersets. We investigatecontinuity, separation, compactness, and convergence of centeredstacks in this setting.
Český abstrakt
We study neighborhood spaces $(X, \nu)$ in which the system $\nu(x)$ of neighborhoods at a point $x \in X$ is a system of subsets of$X$ containing $x$ which need not be a filter, but must only be astack, i.e., closed under the formation of supersets. We investigatecontinuity, separation, compactness, and convergence of centeredstacks in this setting.
Anglický abstrakt
We study neighborhood spaces $(X, \nu)$ in which the system $\nu(x)$ of neighborhoods at a point $x \in X$ is a system of subsets of$X$ containing $x$ which need not be a filter, but must only be astack, i.e., closed under the formation of supersets. We investigatecontinuity, separation, compactness, and convergence of centeredstacks in this setting.
Klíčová slova česky
Raster, neighborhood space, continuous map, separation, compactness, convergence} \begin{abstract}
Klíčová slova anglicky
Raster, neighborhood space, continuous map, separation, compactness, convergence}
Rok RIV
2010
Vydáno
01.02.2010
Nakladatel
Auburn University
Místo
Nippising
ISSN
0146-4124
Ročník
35
Číslo
1
Strany od–do
165–175
Počet stran
11
BIBTEX
@article{BUT48908,
author="Josef {Šlapal} and Tom {Richmond},
title="Neighborhood spaces and convergence",
year="2010",
volume="35",
number="1",
month="February",
pages="165--175",
publisher="Auburn University",
address="Nippising",
issn="0146-4124"
}