dc.contributor.author |
Kenderov, PS |
en |
dc.contributor.author |
Moors, WB |
en |
dc.date.accessioned |
2012-03-27T20:37:00Z |
en |
dc.date.issued |
2005 |
en |
dc.identifier.citation |
Proceedings of the American Mathematical Society 134:1503-1512 2005 |
en |
dc.identifier.issn |
0002-9939 |
en |
dc.identifier.uri |
http://hdl.handle.net/2292/15690 |
en |
dc.description.abstract |
In this paper we prove a theorem more general than the following. Suppose that $ X$ is Lindelöf and $ \alpha$-favourable and $ Y$ is Lindelöf and Cech-complete. Then for each separately continuous function $ f:X\times Y \rightarrow \mathbb{R}$ there exists a residual set $ R$ in $ X$ such that $ f$ is jointly continuous at each point of $ R\times Y$. |
en |
dc.publisher |
American Mathematical Society |
en |
dc.relation.ispartofseries |
Proceedings of the American Mathematical Society |
en |
dc.rights |
Items in ResearchSpace are protected by copyright, with all rights reserved, unless otherwise indicated. Previously published items are made available in accordance with the copyright policy of the publisher. Details obtained from http://www.sherpa.ac.uk/romeo/issn/0002-9939/ |
en |
dc.rights.uri |
https://researchspace.auckland.ac.nz/docs/uoa-docs/rights.htm |
en |
dc.title |
Separate Continuity, Joint Continuity and the Lindelof Property |
en |
dc.type |
Journal Article |
en |
dc.identifier.doi |
10.1090/S0002-9939-05-08499-6 |
en |
pubs.begin-page |
1503 |
en |
pubs.volume |
134 |
en |
dc.rights.holder |
Copyright: American Mathematical Society |
en |
pubs.end-page |
1512 |
en |
dc.rights.accessrights |
http://purl.org/eprint/accessRights/RestrictedAccess |
en |
pubs.subtype |
Article |
en |
pubs.elements-id |
50476 |
en |
pubs.org-id |
Science |
en |
pubs.org-id |
Mathematics |
en |
pubs.record-created-at-source-date |
2010-09-01 |
en |