Tag Archives: b-scale

6th European Set Theory Conference, July 2017

Posted on July 8, 2017 by Assaf Rinot in categories: Invited Talks, Open Problems.

I gave a 3-lecture tutorial at the 6th European Set Theory Conference in Budapest, July 2017. Title: Strong colorings and their applications. Abstract. Consider the following questions. Is the product of two $κ$ -cc partial orders again $κ$ -cc? Does there exist … Continue reading →

Posted in Invited Talks, Open Problems | Tagged b-scale, Cohen real, Luzin set, Minimal Walks, Souslin Tree, Square-Brackets Partition Relations | 4 Comments

Open coloring and the cardinal invariant $b$

Posted on October 8, 2013 by Assaf Rinot in categories: Blog, Expository.

Nik Weaver asked for a direct proof of the fact that Todorcevic’s axiom implies the failure of CH fails. Here goes. Notation. For a set $X$ , we write $[X]^{2}$ for the set of unordered pairs $\{ \{x,x’\}\mid x,x’\in X, x\neq … Continue reading →

Posted in Blog, Expository | Tagged b-scale, OCA | 13 Comments

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

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 →

Posted in Blog, Expository | Tagged b-scale, S-Space | Leave a comment

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

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

Posted in Blog, Expository | Tagged b-scale, S-Space | Leave a comment

c.c.c. vs. the Knaster property

Posted on February 27, 2012 by Assaf Rinot in categories: Blog.

After my previous post on Mekler’s characterization of c.c.c. notions of forcing, Sam, Mike and myself discussed the value of it . We noticed that a prevalent verification of the c.c.c. goes like this: given an uncountable set of conditions, … Continue reading →

Posted in Blog | Tagged b-scale, ccc, Forcing, Knaster | Leave a comment

Dushnik-Miller for regular cardinals (part 2)

Posted on January 26, 2012 by Assaf Rinot in categories: Blog, Expository.

In this post, we shall provide a proof of Todorcevic’s theorem, that $b = ω_{1}$ implies $ω_{1} ↛ (ω_{1}, ω + 2)^{2}$ . This will show that the Erdos-Rado theorem that we discussed in an earlier post, is consistently optimal. Our exposition of Todorcevic’s theorem would be … Continue reading →

Posted in Blog, Expository | Tagged b-scale, Dushnik-Miller, Partition Relations, Square-Brackets Partition Relations | 5 Comments

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 →

Posted in Notes | Tagged b-scale, Cardinal function, Cardinal Invariants, Hereditarily Lindelöf space | 8 Comments

Tag Archives: b-scale

6th European Set Theory Conference, July 2017

Open coloring and the cardinal invariant $b$

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

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

c.c.c. vs. the Knaster property

Dushnik-Miller for regular cardinals (part 2)

Infinite Combinatorial Topology

Archives

Keywords

Set Theory Colloquium

Friends’ Blogs

Recent Comments