Tag Archives: 03E02

A counterexample related to a theorem of Komjáth and Weiss

Posted on June 16, 2023 by Assaf Rinot in categories: Partition Relations, Preprints, Topology.

Joint work with Rodrigo Rey Carvalho. Abstract. In a paper from 1987, Komjath and Weiss proved that for every regular topological space $X$ of character less than $b$ , if $X \to (top ω + 1)_{ω}^{1}$ , then $X \to (top α)_{ω}^{1}$ for all $α < ω_{1}$ . In addition, … Continue reading →

Posted in Partition Relations, Preprints, Topology | Tagged 03E02, 54G20, Prikry-type forcing, ZFC construction | Comments Off

A Shelah group in ZFC

Posted on May 11, 2023 by Assaf Rinot in categories: Groups, Publications.

Joint work with Márk Poór. Abstract. In a paper from 1980, Shelah constructed an uncountable group all of whose proper subgroups are countable. Assuming the continuum hypothesis, he constructed an uncountable group $G$ that moreover admits an integer $n$ satisfying … Continue reading →

Posted in Groups, Publications | Tagged 03E02, 03E75, 20A15, 20E15, 20F06, Jonsson cardinal, Strong coloring, strongly bounded groups, Subadditive, ZFC construction | 3 Comments

Was Ulam right? II: Small width and general ideals

Posted on March 1, 2022 by Assaf Rinot in categories: Partition Relations, Publications.

Joint work with Tanmay Inamdar. Abstract. We continue our study of Sierpinski-type colourings. In contrast to the prequel paper, we focus here on colourings for ideals stratified by their completeness degree. In particular, improving upon Ulam’s theorem and its extension … Continue reading →

Posted in Partition Relations, Publications | Tagged 03E02, 03E35, 03E55, C-sequence, Open Access, Subnormal ideal, Ulam matrix, Was Ulam right? | 1 Comment

Was Ulam right? I: Basic theory and subnormal ideals

Posted on June 29, 2021 by Assaf Rinot in categories: Partition Relations.

Joint work with Tanmay Inamdar. Abstract. We introduce various coloring principles which generalize the so-called onto mapping principle of Sierpinski to larger cardinals and general ideals. We prove that these principles capture the notion of an Ulam matrix and allow … Continue reading →

Posted in Partition Relations | Tagged 03E02, 03E35, 03E55, Amenable C-sequence, C-sequence, Greatly Mahlo, Ineffable cardinal, Sierpinski's onto mapping principle, Subnormal ideal, Ulam matrix, Was Ulam right?, Weakly compact cardinal | 1 Comment

Ramsey theory over partitions III: Strongly Luzin sets and partition relations

Posted on March 30, 2021 by Assaf Rinot in categories: Partition Relations, Publications.

Joint work with Menachem Kojman and Juris Steprāns. Abstract. The strongest type of coloring of pairs of countable ordinals, gotten by Todorcevic from a strongly Luzin set, is shown to be equivalent to the existence of a nonmeager set of … Continue reading →

Posted in Partition Relations, Publications | Tagged 03E02, 03E17, 03E35, Iterated forcing, Luzin set, nonmeager set, positive partition relation, Ramsey theory over partitions, Sierpinski's onto mapping principle, Strong coloring, Strongly Luzin set | 1 Comment

Ramsey theory over partitions I: Positive Ramsey relations from forcing axioms

Posted on January 20, 2021 by Assaf Rinot in categories: Partition Relations, Publications.

Joint work with Menachem Kojman and Juris Steprāns. Abstract. In this series of papers, we advance Ramsey theory of colorings over partitions. In this part, a correspondence between anti-Ramsey properties of partitions and chain conditions of the natural forcing notions … Continue reading →

Posted in Partition Relations, Publications | Tagged 03E02, 03E17, 03E35, GMA, Martin's Axiom, positive partition relation, Ramsey theory over partitions | 1 Comment

Transformations of the transfinite plane

Posted on February 16, 2020 by Assaf Rinot in categories: Partition Relations, Publications.

Joint work with Jing Zhang. Abstract. We study the existence of transformations of the transfinite plane that allow one to reduce Ramsey-theoretic statements concerning uncountable Abelian groups into classical partition relations for uncountable cardinals. To exemplify: we prove that for every … Continue reading →

Posted in Partition Relations, Publications | Tagged 03E02, 03E35, Minimal Walks, Open Access, Reflecting stationary set, square, Square-Brackets Partition Relations, Strong coloring, transformations | 1 Comment

Strong failures of higher analogs of Hindman’s Theorem

Posted on September 23, 2016 by Assaf Rinot in categories: Groups, Partition Relations, Publications.

Joint work with David J. Fernández Bretón. Abstract. We show that various analogs of Hindman’s Theorem fail in a strong sense when one attempts to obtain uncountable monochromatic sets: Theorem 1. There exists a colouring $c : R \to Q$ , such that … Continue reading →

Posted in Groups, Partition Relations, Publications | Tagged 03E02, 03E35, 03E75, 05A17, 05D10, 11P99, 20M14, Chang's conjecture, Commutative cancellative semigroups, Erdos Cardinal, Hindman's Theorem, Jonsson cardinal, Kurepa Hypothesis, Square-Brackets Partition Relations, Weakly compact cardinal, ZFC construction | 1 Comment

Rectangular square-bracket operation for successor of regular cardinals

Posted on April 11, 2012 by Assaf Rinot in categories: Partition Relations, Publications.

Joint work with Stevo Todorcevic. Extended Abstract: Consider the coloring statement $λ^{+} ↛ [λ^{+}; λ^{+}]_{λ^{+}}^{2}$ for a given regular cardinal $λ$ : In 1990, Shelah proved the above for $λ > 2^{ℵ_{0}}$ ; In 1991, Shelah proved the above for $λ > ℵ_{1}$ ; In 1997, Shelah proved the above … Continue reading →

Posted in Partition Relations, Publications | Tagged 03E02, Minimal Walks, Square-Brackets Partition Relations, Successor of Regular Cardinal, ZFC construction | 2 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: 03E02

A counterexample related to a theorem of Komjáth and Weiss

A Shelah group in ZFC

Was Ulam right? II: Small width and general ideals

Was Ulam right? I: Basic theory and subnormal ideals

Ramsey theory over partitions III: Strongly Luzin sets and partition relations

Ramsey theory over partitions I: Positive Ramsey relations from forcing axioms

Transformations of the transfinite plane

Strong failures of higher analogs of Hindman’s Theorem

Rectangular square-bracket operation for successor of regular cardinals

Transforming rectangles into squares, with applications to strong colorings

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