2015
DOI: 10.2168/lmcs-11(1:17)2015
|View full text |Cite
|
Sign up to set email alerts
|

Domain Representations Induced by Dyadic Subbases

Abstract: Abstract. We study domain representations induced by dyadic subbases and show that a proper dyadic subbase of a second-countable regular space X induces an embedding of X in the set of minimal limit elements of a subdomain D of t0, 1, Ku ω . In particular, if X is compact, then X is a retract of the set of limit elements of D.

Help me understand this report
View preprint versions

Search citation statements

Order By: Relevance

Paper Sections

Select...
2
2
1

Citation Types

0
11
0

Year Published

2016
2016
2017
2017

Publication Types

Select...
2
1

Relationship

2
1

Authors

Journals

citations
Cited by 3 publications
(11 citation statements)
references
References 12 publications
0
11
0
Order By: Relevance
“…The set D S is an algebraic pointed dcpo that is the ideal completion of K S . We quote some results known from [6,7]: If S is a proper dyadic subbase of a regular Hausdorff space X, then X is embedded in the space of minimal elements of D S \ K S . Moreover, if X is compact in addition, then we have a quotient map ρ S : D S \ K S → X and X is homeomorphic to the space of minimal elements of D S \ K S .…”
Section: 2mentioning
confidence: 99%
See 1 more Smart Citation
“…The set D S is an algebraic pointed dcpo that is the ideal completion of K S . We quote some results known from [6,7]: If S is a proper dyadic subbase of a regular Hausdorff space X, then X is embedded in the space of minimal elements of D S \ K S . Moreover, if X is compact in addition, then we have a quotient map ρ S : D S \ K S → X and X is homeomorphic to the space of minimal elements of D S \ K S .…”
Section: 2mentioning
confidence: 99%
“…Every finite prefix of the bottomed sequence ϕ S (x) can be considered as a finite time state of the output of computation, and the properties of the set K S := {ϕ S (x)| n : x ∈ X, n < ω} of these sequences have been studied. If S is proper and K S is a conditional upper semilattice with least element (cusl), then we obtain an admissible domain representation of X [6]. Whether K S is a cusl depends not only on S itself but also on the enumeration of S. It has been proved that K S is a cusl regardless of the enumeration of S if and only if S is strongly proper [7].…”
Section: Introductionmentioning
confidence: 99%
“…This section briefly reviews proper dyadic subbases (Tsuiki 2004b;Tsuiki and Tsukamoto 2015). Throughout this section, X = (X, O) is a second-countable Hausdorff space.…”
Section: Dyadic Subbases Of Topological Spacesmentioning
confidence: 99%
“…We define the minimal limit set M S of D S as the set of minimal elements of L S . We have the following (Tsuiki and Tsukamoto 2015).…”
Section: Dyadic Subbases Of Topological Spacesmentioning
confidence: 99%
See 1 more Smart Citation