Tag Archives: S-Space

A guessing principle from a Souslin tree, with applications to topology

Posted on October 9, 2020 by Assaf Rinot in categories: Publications, Souslin Hypothesis, Topology.

Joint work with Roy Shalev. Abstract. We introduce a new combinatorial principle which we call $\clubsuit_{AD}$. This principle asserts the existence of a certain multi-ladder system with guessing and almost-disjointness features, and is shown to be sufficient for carrying out … Continue reading

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Syndetic colorings with applications to S and L

Posted on October 26, 2013 by Assaf Rinot in categories: Blog, Expository, Open Problems.

Notation. Write $\mathcal Q(A):=\{ a\subseteq A\mid a\text{ is finite}, a\neq\emptyset\}$. Definition. An L-space is a regular hereditarily Lindelöf topological space which is not hereditarily separable. Definition. We say that a coloring $c:[\omega_1]^2\rightarrow\omega$ is L-syndetic if the following holds. For every uncountable … Continue reading

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

Posted on April 4, 2013 by Assaf Rinot in categories: Blog, Expository.

Recall that an S-space is a regular hereditarily separable topological space which is not hereditarily Lindelöf. In a previous post, we showed that such a space exists after adding a Cohen real. Here, we shall construct one from an arithmetic … Continue reading

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An $S$-space from a Cohen real

Posted on April 3, 2013 by Assaf Rinot in categories: Blog, Expository.

Recall that an $S$-space is a regular hereditarily separable topological space which is not hereditarily Lindelöf. In this post, we shall establish the consistency of the existence of such a space. Theorem (Roitman, 1979). Let $\mathbb C=({}^{<\omega}\omega,\subseteq)$ be the notion of … Continue reading

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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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