dc.contributor.author |
Paez, J |
|
dc.date.accessioned |
2011-01-22T10:28:00Z |
|
dc.date.available |
2011-01-22T10:28:00Z |
|
dc.date.issued |
1996 |
|
dc.identifier.issn |
0166-8641 |
|
dc.identifier.uri |
http://hdl.handle.net/11154/2925 |
|
dc.description.abstract |
Let X be a connected, locally connected Tychonoff space. Let r(X) (respectively r(0)(X)) denote the multicoherence degree (respectively open multicoherence degree) of X. Let beta X be the Stone-Cech compactification of X and, if X is locally compact, let gamma X be the Freudenthal compactification of X. In this paper, we prove that if X is normal, then r(X) = r(beta X) and r(0)(X) = r(0)(beta X) and if X is locally compact, then r(gamma X) = min{r(Z): Z is a compactification of X}. |
en_US |
dc.language.iso |
en |
en_US |
dc.title |
Multicoherence and compactifications |
en_US |
dc.type |
Article |
en_US |
dc.identifier.idprometeo |
3044 |
|
dc.source.novolpages |
73(1):85-95 |
|
dc.subject.wos |
Mathematics, Applied |
|
dc.subject.wos |
Mathematics |
|
dc.description.index |
WoS: SCI, SSCI o AHCI |
|
dc.subject.keywords |
multicoherence |
|
dc.subject.keywords |
perfect extensions |
|
dc.subject.keywords |
Stone-Cech compactification |
|
dc.subject.keywords |
Freudenthal compactification |
|
dc.relation.journal |
Topology and Its Applications |
|