施密特博弈和康托尔胜局

Pub Date : 2024-04-19 DOI:10.1017/etds.2024.23
DZMITRY BADZIAHIN, STEPHEN HARRAP, EREZ NESHARIM, DAVID SIMMONS
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引用次数: 0

摘要

施密特博弈和康托获胜属性给出了大的另一种概念,类似于更标准的度量和范畴概念。它们直观、灵活,而且适用于最新研究,因此成为研究的热点。我们对最常见变体的定义和它们之间的联系进行了调查。我们还发明了一种新的游戏--康托尔游戏,它有助于提出一个统一的框架。我们证明了一些令人惊奇的新结果,如在度量空间中绝对胜局和$1$ Cantor胜局的重合,以及$1/2$胜局意味着$\mathbb {R}$ 子集的绝对胜局。我们还提出了一个康托胜出集的原型例子,以说明这种集在公设数论和遍历理论中无处不在。
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Schmidt games and Cantor winning sets
Schmidt games and the Cantor winning property give alternative notions of largeness, similar to the more standard notions of measure and category. Being intuitive, flexible, and applicable to recent research made them an active object of study. We survey the definitions of the most common variants and connections between them. A new game called the Cantor game is invented and helps with presenting a unifying framework. We prove surprising new results such as the coincidence of absolute winning and $1$ Cantor winning in metric spaces, and the fact that $1/2$ winning implies absolute winning for subsets of $\mathbb {R}$ . We also suggest a prototypical example of a Cantor winning set to show the ubiquity of such sets in metric number theory and ergodic theory.
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