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SumTopo 2001, Sixteenth Summer Conference on Topology and its Applications
July 18-21, 2001
City College of CUNY
New York, NY, USA

Organizers
Ralph Kopperman (City College, CUNY), Susan Andima (CW Post College, LIU), Gerald Itzkowitz (Queens College, CUNY), Prabudh Misra (College of Staten Island, CUNY), Shelly Rothman (CW Post College, LIU), Aaron Todd (Baruch College, CUNY)

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Reflecting point-countable open families
by
Zoltan Balogh
Miami University, Oxford, OH 45056

Theorem If X is a space with density no bigger than \omega1 such that every subspace of size at most \omega1 has a point-countable base, then X has a point-countable base.

Corollary (Dow). If X is countably compact with every subspace of size \omega1 metrizable, then X is metrizable. Moreover, countably compact can be replaced by any closed hereditary property P such that P+point-countable base implies second countable.

Theorem. If every subspace of size \omega1 of a space X with density no bigger than \omega1 and tightness \omega is meta-Lindelöf, then X is hereditarily meta-Lindelöf.

Theorem (Axiom R). If every subspace of size no bigger than \omega1 of a locally compact space X has a point-countable base, then X is metrizable.

Date received: May 21, 2001

Copyright © 2001 by the author(s). The author(s) of this document and the organizers of the conference have granted their consent to include this abstract in Atlas Conferences Inc. Document # cagw-70.