Was Ulam right? II: small width and general ideals

IF 0.6 4区数学 Q3 MATHEMATICS

Algebra Universalis Pub Date : 2024-02-17 DOI:10.1007/s00012-024-00843-x

Tanmay Inamdar, Assaf Rinot

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引用次数: 0

Abstract

We continue our study of Sierpiński-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 by Hajnal, it is proved that if \(\kappa \) is a regular uncountable cardinal that is not weakly compact in L, then there is a universal witness for non-weak-saturation of \(\kappa \)-complete ideals. Specifically, there are \(\kappa \)-many decompositions of \(\kappa \) such that, for every \(\kappa \)-complete ideal J over \(\kappa \), and every \(B\in J^+\), one of the decompositions shatters B into \(\kappa \)-many \(J^+\)-sets. A second focus here is the feature of narrowness of colourings, one already present in the theorem of Sierpiński. This feature ensures that a colouring suitable for an ideal is also suitable for all superideals possessing the requisite completeness degree. It is proved that unlike successors of regulars, every successor of a singular cardinal admits such a narrow colouring.

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乌兰说得对吗？二：小范围和一般理想

我们继续研究西尔皮斯基类型着色。与前一篇论文不同的是，我们在这篇论文中重点研究了由完备度分层的理想的着色。特别地，我们改进了乌兰定理和哈伊纳尔对它的扩展，证明了如果 \(\kappa \) 是一个在 L 中不是弱紧凑的正则不可数的红心，那么就有\(\kappa \)-完整理想的非弱饱和的普遍见证。具体地说，有 \(\kappa\)-many \(\kappa\)的分解，这样，对于每一个在 \(\kappa\) 上的 \(\kappa\)-complete ideal J，以及每一个 \(B\in J^+\)，其中一个分解会把 B 分解成 \(\kappa\)-many \(J^+\)-sets。这里的第二个重点是着色的狭义性特征，这个特征在西尔潘斯基的定理中就已经存在了。这一特征确保了适合于一个理想的着色也适合于所有具有必要完备度的超理想。研究证明，与正则的后继者不同，奇异红心的每一个后继者都可以接受这种狭义着色。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Algebra Universalis 数学-数学

CiteScore

1.00

自引率

16.70%

发文量

审稿时长

3 months

期刊介绍： Algebra Universalis publishes papers in universal algebra, lattice theory, and related fields. In a pragmatic way, one could define the areas of interest of the journal as the union of the areas of interest of the members of the Editorial Board. In addition to research papers, we are also interested in publishing high quality survey articles.