Tag Archives: Hereditarily Lindelöf space

The S-space problem, and the cardinal invariant $\mathfrak p$

Posted on March 28, 2013 by Assaf Rinot in categories: Blog, Expository, Open Problems.

Recall that an $S$-space is a regular hereditarily separable topological space which is not hereditarily Lindelöf. Do they exist? Consistently, yes. However, Szentmiklóssy proved that compact $S$-spaces do not exist, assuming Martin’s Axiom. Pushing this further, Todorcevic later proved that … Continue reading

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On topological spaces of singular density and minimal weight

Posted on September 30, 2011 by Assaf Rinot in categories: Publications, Topology.

Abstract: We introduce a weakening of the Generalized Continuum Hypothesis, which we will refer to as the Prevalent Singular cardinals Hypothesis (PSH), and show it implies that every topological space of density and weight $\aleph_{\omega_1}$ is not hereditarily Lindelöf. The assumption … Continue reading

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Workshop on Set Theory and its Applications, February 2007

Posted on September 30, 2011 by Assaf Rinot in categories: Invited Talks.

These are the slides of a talk given at the Workshop on Set Theory and its Applications workshop (Weizmann Institute, February 19, 2007). Talk Title: Nets of spaces having singular density Abstract: The weight of a topological space X is the … Continue reading

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Infinite Combinatorial Topology

Posted on February 7, 2006 by Assaf Rinot in categories: Notes.

Back in 2005, as a master student, I attended a course by Boaz Tsaban, entitled “Infinite Combinatorial Topology”. A friend and I decided to produce lecture notes, but in a somewhat loose sense, that is: we sometimes omit material given … Continue reading

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