Tag Archives: Successor of Singular Cardinal

Perspectives on Set Theory, November 2023

Posted on November 16, 2023 by Assaf Rinot in categories: Invited Talks, Open Problems.

I gave an invited talk at the Perspectives on Set Theory conference, November 2023. Talk Title: May the successor of a singular cardinal be Jónsson? Abstract: We’ll survey what’s known about the question in the title and collect ten open … Continue reading →

Posted in Invited Talks, Open Problems | Tagged Jonsson cardinal, Successor of Singular Cardinal | Comments Off

Sigma-Prikry forcing III: Down to Aleph_omega

Posted on September 1, 2021 by Assaf Rinot in categories: Compactness, Publications, Singular Cardinals Combinatorics.

Joint work with Alejandro Poveda and Dima Sinapova. Abstract. We prove the consistency of the failure of the singular cardinals hypothesis at $ℵ_{ω}$ together with the reflection of all stationary subsets of $ℵ_{ω + 1}$ . This shows that two classical results of … Continue reading →

Posted in Compactness, Publications, Singular Cardinals Combinatorics | Tagged Iterated forcing, Sigma-Prikry, Successor of Singular Cardinal | 1 Comment

Sigma-Prikry forcing II: Iteration Scheme

Posted on December 4, 2019 by Assaf Rinot in categories: Compactness, Publications, Singular Cardinals Combinatorics.

Joint work with Alejandro Poveda and Dima Sinapova. Abstract. In Part I of this series, we introduced a class of notions of forcing which we call $Σ$ -Prikry, and showed that many of the known Prikry-type notions of forcing that centers … Continue reading →

Posted in Compactness, Publications, Singular Cardinals Combinatorics | Tagged Iterated forcing, Prikry-type forcing, Sigma-Prikry, Singular cardinals combinatorics, Successor of Singular Cardinal | 1 Comment

Sigma-Prikry forcing I: The Axioms

Posted on September 2, 2019 by Assaf Rinot in categories: Compactness, Publications, Singular Cardinals Combinatorics.

Joint work with Alejandro Poveda and Dima Sinapova. Abstract. We introduce a class of notions of forcing which we call $Σ$ -Prikry, and show that many of the known Prikry-type notions of forcing that centers around singular cardinals of countable cofinality … Continue reading →

Posted in Compactness, Publications, Singular Cardinals Combinatorics | Tagged AIM forcing, Open Access, Prikry-type forcing, Sigma-Prikry, Singular cardinals combinatorics, Successor of Singular Cardinal | 1 Comment

Putting a diamond inside the square

Posted on February 18, 2015 by Assaf Rinot in categories: Publications, Squares and Diamonds.

Abstract. By a 35-year-old theorem of Shelah, $_{λ} + ♢ (λ^{+})$ does not imply square-with-built-in-diamond_lambda for regular uncountable cardinals $λ$ . Here, it is proved that $_{λ} + ♢ (λ^{+})$ is equivalent to square-with-built-in-diamond_lambda for every singular cardinal $λ$ . Downloads: Citation information: A. Rinot, Putting a diamond inside … Continue reading →

Posted in Publications, Squares and Diamonds | Tagged 03E05, 03E45, Diamond, square, Successor of Singular Cardinal | 1 Comment

A cofinality-preserving small forcing may introduce a special Aronszajn tree

Posted on October 2, 2011 by Assaf Rinot in categories: Publications, Squares and Diamonds.

Extended Abstract: Shelah proved that Cohen forcing introduces a Souslin tree; Jensen proved that a c.c.c. forcing may consistently add a Kurepa tree; Todorcevic proved that a Knaster poset may already force the Kurepa hypothesis; Irrgang introduced a c.c.c. notion … Continue reading →

Posted in Publications, Squares and Diamonds | Tagged 03E04, 03E05, 03E35, Aronszajn tree, Small forcing, Successor of Singular Cardinal, weak square | Leave a comment

The failure of diamond on a reflecting stationary set

Posted on September 27, 2011 by Assaf Rinot in categories: Publications, Squares and Diamonds.

Joint work with Moti Gitik. Abstract: It is shown that the failure of $♢_{S}$ , for a subset $S \subseteq ℵ_{ω + 1}$ that reflects stationarily often, is consistent with GCH and ${AP}_{ℵ_{ω}}$ , relatively to the existence of a supercompact cardinal. This should be comapred with … Continue reading →

Posted in Publications, Squares and Diamonds | Tagged 03E04, 03E35, approachability ideal, Diamond, Generalized Clubs, Iterated forcing, Open Access, sap, Shelah's Strong Hypothesis, square, stationary reflection, Successor of Singular Cardinal, very good scale | 1 Comment

A relative of the approachability ideal, diamond and non-saturation

Posted on September 27, 2011 by Assaf Rinot in categories: Publications, Squares and Diamonds.

Abstract: Let $λ$ denote a singular cardinal. Zeman, improving a previous result of Shelah, proved that $_{λ}^{*}$ together with $2^{λ} = λ^{+}$ implies $♢_{S}$ for every $S \subseteq λ^{+}$ that reflects stationarily often. In this paper, for a subset $S \subset λ^{+}$ , a normal subideal of … Continue reading →

Posted in Publications, Squares and Diamonds | Tagged 03E05, 03E35, approachability ideal, Diamond, diamond star, Iterated forcing, Non-saturation, sap, square, stationary hitting, stationary reflection, Subadditive, Successor of Singular Cardinal | 5 Comments

Transforming rectangles into squares, with applications to strong colorings

Posted on September 26, 2011 by Assaf Rinot in categories: Partition Relations, Publications.

Abstract: It is proved that every singular cardinal $λ$ admits a function $rts : [λ^{+}]^{2} \to [λ^{+}]^{2}$ that transforms rectangles into squares. That is, whenever $A, B$ are cofinal subsets of $λ^{+}$ , we have $rts [A ⊛ B] \supseteq C ⊛ C$ , for some cofinal subset $C \subseteq λ^{+}$ . As a … Continue reading →

Posted in Partition Relations, Publications | Tagged 03E02, Club Guessing, Minimal Walks, Open Access, Square-Brackets Partition Relations, Successor of Singular Cardinal, transformations, ZFC construction | 1 Comment

Tag Archives: Successor of Singular Cardinal

Perspectives on Set Theory, November 2023

Sigma-Prikry forcing III: Down to Aleph_omega

Sigma-Prikry forcing II: Iteration Scheme

Sigma-Prikry forcing I: The Axioms

Putting a diamond inside the square

A cofinality-preserving small forcing may introduce a special Aronszajn tree

The failure of diamond on a reflecting stationary set

A relative of the approachability ideal, diamond and non-saturation

Transforming rectangles into squares, with applications to strong colorings

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