梅纳斯的猜想被重新审视了

P. Matet
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引用次数: 2

摘要

在1974年发表的一篇文章中,Menas推测任意的平稳子集都可以被分割成许多成对不相交的平稳子集。尽管鲍姆加特纳和泰勒很久以前就证明了这个猜想始终是错误的,但它仍然困扰着论文。在什么情况下它成立?在ZFC中可以证明多少?我们从这个猜想的简史开始,然后形成一个新的版本,最后我们不断削弱这个新的断言,直到在Usuba的工作基础上,我们发现了一些可以证明的东西。
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MENAS’S CONJECTURE REVISITED
Abstract In an article published in 1974, Menas conjectured that any stationary subset of can be split in many pairwise disjoint stationary subsets. Even though the conjecture was shown long ago by Baumgartner and Taylor to be consistently false, it is still haunting papers on . In which situations does it hold? How much of it can be proven in ZFC? We start with an abridged history of the conjecture, then we formulate a new version of it, and finally we keep weakening this new assertion until, building on the work of Usuba, we hit something we can prove.
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POUR-EL’S LANDSCAPE CATEGORICAL QUANTIFICATION POINCARÉ-WEYL’S PREDICATIVITY: GOING BEYOND A TOPOLOGICAL APPROACH TO UNDEFINABILITY IN ALGEBRAIC EXTENSIONS OF John MacFarlane, Philosophical Logic: A Contemporary Introduction, Routledge Contemporary Introductions to Philosophy, Routledge, New York, and London, 2021, xx + 238 pp.
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