无无限反链的偏序集的链覆盖数

Pub Date : 2023-10-31 DOI:10.5802/crmath.511

Uri Abraham, Maurice Pouzet

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引用次数: 0

摘要

对于不可数基数ν，我们给出一个具有基数和覆盖数ν的序集列表，使得对于每一个不存在无限反链的序集P, Cov(P)≥ν当且仅当P嵌入该列表中的一个元素。如果ν是后继基数，即[ν] 2及其对偶，则该列表有两个元素;如果ν是cf(ν)弱紧的极限基数，则该列表有四个元素。对于ν=¹，第一作者给出了一个列表;他的构造被F. Dorais推广到每一个无限的后继的基本空间。

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The chain covering number of a poset with no infinite antichains

The chain covering number Cov(P) of a poset P is the least number of chains needed to cover P. For an uncountable cardinal ν, we give a list of posets of cardinality and covering number ν such that for every poset P with no infinite antichain, Cov(P)≥ν if and only if P embeds a member of the list. This list has two elements if ν is a successor cardinal, namely [ν] 2 and its dual, and four elements if ν is a limit cardinal with cf(ν) weakly compact. For ν=ℵ 1 , a list was given by the first author; his construction was extended by F. Dorais to every infinite successor cardinal ν.

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