有限结构超积中的大拉姆齐度

IF 0.6 2区数学 Q2 LOGIC Annals of Pure and Applied Logic Pub Date : 2024-03-19 DOI:10.1016/j.apal.2024.103439

Dana Bartošová , Mirna Džamonja , Rehana Patel , Lynn Scow

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引用次数: 0

摘要

我们提出了结构拉姆齐理论从有限结构到超积的转移原理。我们证明，在某些温和条件下，当一类有限结构具有有限小拉姆齐度时，在（广义）连续假说下，超积对于内部着色具有有限大拉姆齐度。以有限线性阶的超积为例，证明了限制内部着色的必要性。在 CH 条件下，这个超积作为脊梁，具有有理数的阶类型的不可数类比性。德弗林在......中精确地计算出了的有限大拉姆齐阶数。由此可以立即看出，它不具有有限大拉姆齐阶数。此外，我们扩展了 Devlin 的着色，证明它在 in 的每一个副本上都见证了有限元组 in 的大拉姆齐度，因此也见证了 in 的大拉姆齐度。这项工作进一步证实了超积是研究有限和无限结构的拉姆齐性质的合适环境。

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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Big Ramsey degrees in ultraproducts of finite structures

We develop a transfer principle of structural Ramsey theory from finite structures to ultraproducts. We show that under certain mild conditions, when a class of finite structures has finite small Ramsey degrees, under the (Generalized) Continuum Hypothesis the ultraproduct has finite big Ramsey degrees for internal colorings. The necessity of restricting to internal colorings is demonstrated by the example of the ultraproduct of finite linear orders. Under CH, this ultraproduct $L^{⁎}$ has, as a spine, $η_{1}$ , an uncountable analogue of the order type of rationals η. Finite big Ramsey degrees for η were exactly calculated by Devlin in [5]. It is immediate from [39] that $η_{1}$ fails to have finite big Ramsey degrees. Moreover, we extend Devlin's coloring to $η_{1}$ to show that it witnesses big Ramsey degrees of finite tuples in η on every copy of η in $η_{1}$ , and consequently in $L^{⁎}$ . This work gives additional confirmation that ultraproducts are a suitable environment for studying Ramsey properties of finite and infinite structures.

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来源期刊

Annals of Pure and Applied Logic 数学-数学

CiteScore

1.40

自引率

12.50%

发文量

审稿时长

200 days

期刊介绍： The journal Annals of Pure and Applied Logic publishes high quality papers in all areas of mathematical logic as well as applications of logic in mathematics, in theoretical computer science and in other related disciplines. All submissions to the journal should be mathematically correct, well written (preferably in English)and contain relevant new results that are of significant interest to a substantial number of logicians. The journal also considers submissions that are somewhat too long to be published by other journals while being too short to form a separate memoir provided that they are of particular outstanding quality and broad interest. In addition, Annals of Pure and Applied Logic occasionally publishes special issues of selected papers from well-chosen conferences in pure and applied logic.

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