Simultaneously vanishing higher derived limits

IF 2.8 1区 数学 Q1 MATHEMATICS
J. Bergfalk, C. Lambie-Hanson
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引用次数: 9

Abstract

Abstract In 1988, Sibe Mardešić and Andrei Prasolov isolated an inverse system $\textbf {A}$ with the property that the additivity of strong homology on any class of spaces which includes the closed subsets of Euclidean space would entail that $\lim ^n\textbf {A}$ (the nth derived limit of $\textbf {A}$ ) vanishes for every $n>0$ . Since that time, the question of whether it is consistent with the $\mathsf {ZFC}$ axioms that $\lim ^n \textbf {A}=0$ for every $n>0$ has remained open. It remains possible as well that this condition in fact implies that strong homology is additive on the category of metric spaces. We show that assuming the existence of a weakly compact cardinal, it is indeed consistent with the $\mathsf {ZFC}$ axioms that $\lim ^n \textbf {A}=0$ for all $n>0$ . We show this via a finite-support iteration of Hechler forcings which is of weakly compact length. More precisely, we show that in any forcing extension by this iteration, a condition equivalent to $\lim ^n\textbf {A}=0$ will hold for each $n>0$ . This condition is of interest in its own right; namely, it is the triviality of every coherent n-dimensional family of certain specified sorts of partial functions $\mathbb {N}^2\to \mathbb {Z}$ which are indexed in turn by n-tuples of functions $f:\mathbb {N}\to \mathbb {N}$ . The triviality and coherence in question here generalise the classical and well-studied case of $n=1$ .
同时消失的更高衍生极限
1988年,Sibe Mardešić和Andrei Prasolov分离出了一个逆系统$\textbf {A}$,该系统在任何包含欧几里得空间闭子集的空间上的强同构的可加性使得$\textbf {A}$ ($\textbf {A}$的第n个导出极限)对每$n bb0 0$消失。从那时起,它是否与$\mathsf {ZFC}$公理$\lim ^n \textbf {A}=0$对于每$n> $一致的问题一直没有解决。也有可能这个条件实际上暗示了强同调在度量空间的范畴上是加性的。我们证明了假设弱紧基数存在,它确实符合$\mathsf {ZFC}$公理$\lim ^n \textbf {a}=0$对于所有$n> $。我们通过一个弱紧致长度的Hechler强迫的有限支持迭代来证明这一点。更准确地说,我们证明了在此迭代的任何强制扩展中,一个等价于$\lim ^n\textbf {a}=0$的条件将对每$n> $成立。这种情况本身就令人感兴趣;也就是说,它是某些特定种类的偏函数$\mathbb {N}^2\到\mathbb {Z}$的每一个连贯的N维族的平凡性,这些偏函数依次由函数$f:\mathbb {N}\到\mathbb {N}$的N元组索引。这里讨论的琐碎性和连贯性概括了经典的和研究得很好的n=1的情况。
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来源期刊
Forum of Mathematics Pi
Forum of Mathematics Pi Mathematics-Statistics and Probability
CiteScore
3.50
自引率
0.00%
发文量
21
审稿时长
19 weeks
期刊介绍: Forum of Mathematics, Pi is the open access alternative to the leading generalist mathematics journals and are of real interest to a broad cross-section of all mathematicians. Papers published are of the highest quality. Forum of Mathematics, Pi and Forum of Mathematics, Sigma are an exciting new development in journal publishing. Together they offer fully open access publication combined with peer-review standards set by an international editorial board of the highest calibre, and all backed by Cambridge University Press and our commitment to quality. Strong research papers from all parts of pure mathematics and related areas are welcomed. All published papers are free online to readers in perpetuity.
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