Continuity and Directed Completion of Topological Spaces

被引：3

作者：

Zhang, Zhongxi ^{[1
,2
]}

Shi, Fu-Gui ^{[1
]}

Li, Qingguo ^{[3
]}

机构：

[1] Beijing Inst Technol, Sch Math & Stat, Beijing 100081, Peoples R China

[2] Yantai Univ, Sch Comp & Control Engn, Yantai 264005, Shandong, Peoples R China

[3] Hunan Univ, Coll Math & Econometr, Changsha 410082, Hunan, Peoples R China

来源：

ORDER-A JOURNAL ON THE THEORY OF ORDERED SETS AND ITS APPLICATIONS | 2022年 / 39卷 / 03期

基金：

中国国家自然科学基金;

关键词：

Weak monotone convergence space; Continuity; Quasicontinuity; Meet continuity; Delta-space; Scott completion; POSETS;

D O I：

10.1007/s11083-021-09586-z

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

In this paper we introduce the notions of continuity, meet continuity and quasicontinuity of Delta-spaces, where a Delta-space is a monotone determined, weak monotone convergence space. We prove that: a Delta-space (X, O(X)) is continuous iff the topology lattice O(X) is completely distributive; a Delta-space (X, O(X)) is meet continuous iff O(X) is a complete Heyting algebra; a Delta-space (X, O(X)) is continuous iff it is both meet continuous and quasicontinuous. The concepts of continuity, s(2)-continuity, O-continuity, strong continuity of posets are shown to be special cases of the continuity of Delta-spaces. We also introduce a type of directed completion of Delta-spaces, called Scott completion. For each Delta-space (X, O(X)), the topology lattice O(X) is isomorphic to the topology lattice of its Scott completion. The D-completion, D-theta-completion and D-s2 -completion of posets are included in the Scott completion.

引用

页码：407 / 420

页数：14

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