Tag Archives: stationary reflection

Knaster and friends II: The C-sequence number

Posted on October 23, 2019 by Assaf Rinot in categories: Compactness, Publications, Singular Cardinals Combinatorics.

Joint work with Chris Lambie-Hanson. Abstract. Motivated by a characterization of weakly compact cardinals due to Todorcevic, we introduce a new cardinal characteristic, the C-sequence number, which can be seen as a measure of the compactness of a regular uncountable … Continue reading →

Posted in Compactness, Publications, Singular Cardinals Combinatorics | Tagged 03E05, 03E35, 03E55, 06E10, C-sequence, Closed coloring, Greatly Mahlo, Knaster, Knaster and friends, Open Access, Prikry-type forcing, square, stationary reflection, unbounded function | 1 Comment

The 15th International Workshop on Set Theory in Luminy, September 2019

Posted on September 28, 2019 by Assaf Rinot in categories: Invited Talks.

I gave an invited talk at the 15th International Workshop on Set Theory in Luminy in Marseille, September 2019. Talk Title: Chain conditions, unbounded colorings and the C-sequence spectrum. Abstract: The productivity of the $κ$ -chain condition, where $κ$ is a regular, … Continue reading →

Posted in Invited Talks | Tagged Closed coloring, Knaster, Precaliber, stationary reflection, unbounded function | Comments Off

Knaster and friends I: Closed colorings and precalibers

Posted on April 26, 2018 by Assaf Rinot in categories: Partition Relations, Publications.

Joint work with Chris Lambie-Hanson. Abstract. The productivity of the $κ$ -chain condition, where $κ$ is a regular, uncountable cardinal, has been the focus of a great deal of set-theoretic research. In the 1970s, consistent examples of $κ$ -cc posets whose squares … Continue reading →

Posted in Partition Relations, Publications | Tagged Closed coloring, Knaster, Knaster and friends, Precaliber, square, stationary reflection, unbounded function | 2 Comments

A remark on Schimmerling’s question

Posted on November 14, 2017 by Assaf Rinot in categories: Publications, Souslin Hypothesis.

Joint work with Ari Meir Brodsky. Abstract. Schimmerling asked whether $_{λ}^{*}$ together with GCH entails the existence of a $λ^{+}$ -Souslin tree, for a singular cardinal $λ$ . Here, we provide an affirmative answer under the additional assumption that there exists a … Continue reading →

Posted in Publications, Souslin Hypothesis | Tagged 03E05, 03E35, 03E65, 05C05, free Souslin tree, Microscopic Approach, Parameterized proxy principle, Postprocessing function, specializable Souslin tree, stationary reflection, weak square | 1 Comment

Weak square and stationary reflection

Posted on November 8, 2017 by Assaf Rinot in categories: Publications, Squares and Diamonds.

Joint work with Gunter Fuchs. Abstract. It is well-known that the square principle $_{λ}$ entails the existence of a non-reflecting stationary subset of $λ^{+}$ , whereas the weak square principle $_{λ}^{*}$ does not. Here we show that if $μ^{c f (λ)} < λ$ for all $μ < λ$ , … Continue reading →

Posted in Publications, Squares and Diamonds | Tagged 03E05, 03E35, 03E57, Diamond, Forcing Axioms, stationary reflection, weak square | Leave a comment

MFO workshop in Set Theory, February 2017

Posted on February 19, 2017 by Assaf Rinot in categories: Invited Talks.

I gave an invited talk at the Set Theory workshop in Obwerwolfach, February 2017. Talk Title: Coloring vs. Chromatic. Abstract: In a joint work with Chris Lambie-Hanson, we study the interaction between compactness for the chromatic number (of graphs) and … Continue reading →

Posted in Invited Talks | Tagged Chromatic number, coloring number, incompactness, stationary reflection | Leave a comment

The eightfold way

Posted on December 23, 2016 by Assaf Rinot in categories: Compactness.

Joint work with James Cummings, Sy-David Friedman, Menachem Magidor, and Dima Sinapova. Abstract. Three central combinatorial properties in set theory are the tree property, the approachability property and stationary reflection. We prove the mutual independence of these properties by showing … Continue reading →

Posted in Compactness | Tagged approachability ideal, Aronszajn tree, Iterated forcing, Prikry-type forcing, stationary reflection, Weakly compact cardinal | 1 Comment

Reflection on the coloring and chromatic numbers

Posted on December 18, 2016 by Assaf Rinot in categories: Compactness, Infinite Graphs, Publications.

Joint work with Chris Lambie-Hanson. Abstract. We prove that reflection of the coloring number of graphs is consistent with non-reflection of the chromatic number. Moreover, it is proved that incompactness for the chromatic number of graphs (with arbitrarily large gaps) … Continue reading →

Posted in Compactness, Infinite Graphs, Publications | Tagged 03E35, 05C15, 05C63, Chang's conjecture, Chromatic number, coloring number, Fodor-type reflection, incompactness, Iterated forcing, Parameterized proxy principle, Postprocessing function, Rado's conjecture, square, stationary reflection | 2 Comments

The reflection principle $R_{2}$

Posted on May 20, 2016 by Assaf Rinot in categories: Blog.

A few years ago, in this paper, I introduced the following reflection principle: Definition. $R_{2} (θ, κ)$ asserts that for every function $f : E_{< κ}^{θ} \to κ$ , there exists some $j < κ$ for which the following set is nonstationary: $A_{j} := {δ \in E_{κ}^{θ} ∣ f^{- 1} [j] \cap δ is nonstationary} .$ I wrote there … Continue reading →

Posted in Blog | Tagged reflection principles, square, stationary reflection, Weakly compact cardinal | Leave a comment

Young Researchers in Set Theory, March 2011

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

These are the slides of a talk I gave at the Young Researchers in Set Theory 2011 meeting (Königswinter, 21–25 March 2011). Talk Title: Around Jensen’s square principle Abstract: Jensen‘s square principle for a cardinal $λ$ asserts the existence of a particular ladder … Continue reading →

Posted in Invited Talks | Tagged Minimal Walks, Singular cardinals combinatorics, Souslin Tree, square, stationary reflection, weak square | Leave a comment

Tag Archives: stationary reflection

Knaster and friends II: The C-sequence number

The 15th International Workshop on Set Theory in Luminy, September 2019

Knaster and friends I: Closed colorings and precalibers

A remark on Schimmerling’s question

Weak square and stationary reflection

MFO workshop in Set Theory, February 2017

The eightfold way

Reflection on the coloring and chromatic numbers

The reflection principle $R_{2}$

Young Researchers in Set Theory, March 2011

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