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In this paper we examine the interactions between the topology of certain linearly ordered topological spaces (LOTS) and the properties of trees in whose branch spaces they embed. As one example of the interaction between ordered spaces and trees, we characterize hereditary ultraparacompactness in a LOTS (or GO-space) X in terms of the possibility of embedding the space X in the branch space of a certain kind of tree. 相似文献
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Strashimir G. Popvassilev 《Proceedings of the American Mathematical Society》2004,132(10):3121-3130
Call a topological space base-cover paracompact if has an open base such that every cover of contains a locally finite subcover. A subspace of the Sorgenfrey line is base-cover paracompact if and only if it is . The countable sequential fan is not base-cover paracompact. A paracompact space is locally compact if and only if its product with every compact space is base-cover paracompact.
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Wei-Xue Shi 《Proceedings of the American Mathematical Society》1999,127(2):615-618
In this paper, we prove that if a perfect GO-space has a -discrete dense set, then has a perfect linearly ordered extension. This answers a problem raised by H. R. Bennett, D. J. Lutzer and S. Purisch. And the result is also a partial answer to an old problem posed by H. R. Bennett and D. J. Lutzer.
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数学家 N.Kemoto,T.Nogura,K.D.Sm ith和 Y .Yajim a 1996年证明了两个序数乘积的子空间的正规性、集体正规性、收缩性是等价的 .本文把这个命题进行了推广 ,得到了两个 GO -空间乘积的任意子空间的正规性、集体正规性、收缩性是等价的 . 相似文献
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本文证明了最小线性序紧化中点的共尾数不超过ω1的有限个GO-空间的乘积是遗传集体Hausdorff空间。 相似文献
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In the first part of this note, we mainly prove that monotone metacompactness is hereditary with respect to closed subspaces and open Fó-subspaces. For a generalized ordered (GO)-space X, we also show that X is monotonically metacompact if and only if its closed linearly ordered extension X* is monotonically metacompact. We also point out that every non-Archimedean space X is monotonically ultraparacompact. In the second part of this note, we give an alternate proof of the result that McAuley space is paracompact and metacompact. 相似文献
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我们知道,GO-空间乘积的子空间不一定仿紧.在2000年,数学家N.Kemoto,K.Tamano和Y.Yajima证明了两个特殊的GO-空间-序数乘积子空间的仿紧性的一个充分必要条件.把这个定理进行了推广,到了两个一般的GO-空间乘积的任意子空间仿紧性的一个充分必要条件. 相似文献
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本文对“每一个GO-空间都是可数仿紧的”这一性质进行了推广,得到了“每一个GO-空间都是1:x∈[LX-X]}仿紧的”;论证了在一定条件下,一个拓扑空间和一个GO-空间乘积的正规性与这个拓扑空间和一个正则不可数基数的乘积正规性是等价的;并在这两个结论的基础上,又得出了一些重要的定理. 相似文献