New Concepts of Dense set in i-Topological space and Proximity Space

In [5], Metakides and Nerode introduced the study of recursively enumerable (r.e.) substructures of a recursively presented structure. The main line of study presented in [5] is to examine the effective content of certain algebraic structures. In [6], Metakides and Nerode studied the lattice of r.e. subspaces of a recursively presented vector space. This lattice was later studied by Kalantari, Remmel, Retzlaff and Shore. Similar studies have been done by Metakides and Nerode [7] for algebraically closed fields, by Remmel [10] for Boolean algebras and by Metakides and Remmel [8] and [9] for orderings. Kalantari and Retzlaff [4] introduced and studied the lattice of r.e. subsets of a recursively presented topological space. Kalantari and Retzlaff consideredX, a topological space with ⊿, a countable basis. This basis is coded into integers and with the help of this coding, r.e. subsets ofωgive rise to r.e. subsets ofX. The notion of “recursiveness” of a topological space is the natural next step which gives rise to the question of what should be the “degree” of an r.e. open subset ofX? It turns out that any r.e. open set partitions ⊿; into four sets whose Turing degrees become central in answering the question raised above.In this paper we show that the degrees of the elements of the partition of ⊿ imposed by an r.e. open set can be “controlled independently” in a sense to be made precise in the body of the paper. In [4], Kalantari and Retzlaff showed that givenAany r.e. set andany r.e. open subset ofX, there exists an r.e. open set ℋ which is a subset ofand is dense in(in a topological sense) and in whichAis coded. This shows that modulo a nowhere dense set, an r.e. open set can become as complicated as desired. After giving the general technical and notational machinery in §1, and giving the particulars of our needs in §2, in §3 we prove that the set ℋ described above could be made to be precisely of degree ofA. We then go on and establish various results (both existential and universal) on the mentioned partitioning of ⊿. One of the surprising results is that there are r.e. open sets such that every element of partitioning of ⊿ is of a different degree. Since the exact wording of the results uses the technical definitions of these partitioning elements, we do not summarize the results here and ask the reader to examine §3 after browsing through §§1 and 2.

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Characterized Fuzzy R2.5 and Characterized Fuzzy T3.5 Spaces

JOURNAL OF ADVANCES IN MATHEMATICS ◽

10.24297/jam.v13i1.5684 ◽

2017 ◽

Vol 13 (1) ◽

pp. 7048-7073

Author(s):

Ahmed Saeed Abd-Allah

Keyword(s):

Topological Space ◽

Tychonoff Space ◽

Proximity Space ◽

Completely Regular ◽

Fuzzy Function ◽

Continuous Mappings ◽

Fuzzy Space ◽

Fuzzy Topological Space ◽

The Given ◽

Proximity Spaces

This paper, deals with, introduce and study the notions of haracterized fuzzy R2.5 spaces and of characterized fuzzy T3.5 spaces by using the notion of fuzzy function family presented in [21] and the notion of Ï†1,2Ïˆ1,2-fuzzy continuous mappings presented in [5] as a generalization of all the weaker and stronger forms of the fuzzy completely regular spaces introduced in [11,24,26,29]. We denote by characterized fuzzy T3.5 space or characterized fuzzy Tychonoff space to the characterized fuzzy space which is characterized fuzzy T1 and characterized fuzzy R2.5 space in this sense. The relations between the characterized fuzzy T3.5 spaces, the characterized fuzzy T4 spaces and the characterized fuzzy T3 spaces are introduced. When the given fuzzy topological space is normal, then the related characterized fuzzy space is finer than the associated characterized fuzzy proximity space which is presented in [1]. Moreover, the associated characterized fuzzy proximity spaces and the characterized fuzzy T4 spaces are identical with help of the complementarilysymmetric fuzzy topogenous structure, that is, identified with the fuzzy proximity Î´. More generally, the fuzzy function family of all Ï†1,2Ïˆ1,2-fuzzy continuous mappings are applied to show that the characterized fuzzy R2.5 spaces and the associated characterized fuzzy proximity spaces are identical.

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£-Single Valued Extremally Disconnected Ideal Neutrosophic Topological Spaces

Symmetry ◽

10.3390/sym13010053 ◽

2020 ◽

Vol 13 (1) ◽

pp. 53

Author(s):

Fahad Alsharari

Keyword(s):

Topological Spaces ◽

Neutrosophic Sets ◽

Extremally Disconnected ◽

Fundamental Properties ◽

Separation Axioms ◽

New Concepts ◽

Definition Of

This paper aims to mark out new concepts of r-single valued neutrosophic sets, called r-single valued neutrosophic £-closed and £-open sets. The definition of £-single valued neutrosophic irresolute mapping is provided and its characteristic properties are discussed. Moreover, the concepts of £-single valued neutrosophic extremally disconnected and £-single valued neutrosophic normal spaces are established. As a result, a useful implication diagram between the r-single valued neutrosophic ideal open sets is obtained. Finally, some kinds of separation axioms, namely r-single valued neutrosophic ideal-Ri (r-SVNIRi, for short), where i={0,1,2,3}, and r-single valued neutrosophic ideal-Tj (r-SVNITj, for short), where j={1,2,212,3,4}, are introduced. Some of their characterizations, fundamental properties, and the relations between these notions have been studied.

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Antisymmetry of the Stochastical Order on all Ordered Topological Spaces

Analysis and Geometry in Metric Spaces ◽

10.1515/agms-2019-0012 ◽

2019 ◽

Vol 7 (1) ◽

pp. 250-252 ◽

Cited By ~ 1

Author(s):

Tobias Fritz

Keyword(s):

Topological Space ◽

General Result ◽

Elementary Proof ◽

Short Note ◽

Stochastic Order ◽

Topological Spaces ◽

Probability Measures ◽

Ordered Topological Space ◽

Special Cases

Abstract In this short note, we prove that the stochastic order of Radon probability measures on any ordered topological space is antisymmetric. This has been known before in various special cases. We give a simple and elementary proof of the general result.

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Focal Function in i-Topological Spaces via Proximity Spaces

Journal of Physics Conference Series ◽

10.1088/1742-6596/1591/1/012083 ◽

2020 ◽

Vol 1591 ◽

pp. 012083

Author(s):

Yiezi Kadham Mahdi Altalkany ◽

Luay A. A. Al Swidi

Keyword(s):

Topological Spaces ◽

Proximity Spaces

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Some Modifications of Pairwise Soft Sets and Some of Their Related Concepts

Mathematics ◽

10.3390/math9151781 ◽

2021 ◽

Vol 9 (15) ◽

pp. 1781

Author(s):

Samer Al Ghour

Keyword(s):

Topological Space ◽

Sufficient Conditions ◽

Soft Sets ◽

New Concepts ◽

Bitopological Spaces ◽

The Relationship ◽

Soft Topological Space

In this paper, we first define soft u-open sets and soft s-open as two new classes of soft sets on soft bitopological spaces. We show that the class of soft p-open sets lies strictly between these classes, and we give several sufficient conditions for the equivalence between soft p-open sets and each of the soft u-open sets and soft s-open sets, respectively. In addition to these, we introduce the soft u-ω-open, soft p-ω-open, and soft s-ω-open sets as three new classes of soft sets in soft bitopological spaces, which contain soft u-open sets, soft p-open sets, and soft s-open sets, respectively. Via soft u-open sets, we define two notions of Lindelöfeness in SBTSs. We discuss the relationship between these two notions, and we characterize them via other types of soft sets. We define several types of soft local countability in soft bitopological spaces. We discuss relationships between them, and via some of them, we give two results related to the discrete soft topological space. According to our new concepts, the study deals with the correspondence between soft bitopological spaces and their generated bitopological spaces.

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On topological quotient maps preserved by pullbacks or products

Mathematical Proceedings of the Cambridge Philosophical Society ◽

10.1017/s0305004100045850 ◽

1970 ◽

Vol 67 (3) ◽

pp. 553-558 ◽

Cited By ~ 72

Author(s):

B. J. Day ◽

G. M. Kelly

Keyword(s):

Topological Space ◽

Topological Spaces ◽

Quotient Maps ◽

Continuous Maps

We are concerned with the category of topological spaces and continuous maps. A surjection f: X → Y in this category is called a quotient map if G is open in Y whenever f−1G is open in X. Our purpose is to answer the following three questions:Question 1. For which continuous surjections f: X → Y is every pullback of f a quotient map?Question 2. For which continuous surjections f: X → Y is f × lz: X × Z → Y × Z a quotient map for every topological space Z? (These include all those f answering to Question 1, since f × lz is the pullback of f by the projection map Y ×Z → Y.)Question 3. For which topological spaces Z is f × 1Z: X × Z → Y × Z a qiptoent map for every quotient map f?

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Separation Axioms in Intuitionistic Fuzzy Topological Spaces

Advances in Fuzzy Systems ◽

10.1155/2012/604396 ◽

2012 ◽

Vol 2012 ◽

pp. 1-7

Author(s):

Amit Kumar Singh ◽

Rekha Srivastava

Keyword(s):

Topological Space ◽

Left Adjoint ◽

Topological Spaces ◽

Intuitionistic Fuzzy ◽

Separation Axioms ◽

Fuzzy Topological Space ◽

Fuzzy Topological Spaces

In this paper we have studied separation axiomsTi,i=0,1,2in an intuitionistic fuzzy topological space introduced by Coker. We also show the existence of functorsℬ:IF-Top→BF-Topand𝒟:BF-Top→IF-Topand observe that𝒟is left adjoint toℬ.

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Uniformity on generalized topological spaces

Arab Journal of Mathematical Sciences ◽

10.1108/ajms-03-2021-0058 ◽

2021 ◽

Vol ahead-of-print (ahead-of-print) ◽

Author(s):

Dipankar Dey ◽

Dhananjay Mandal ◽

Manabendra Nath Mukherjee

Keyword(s):

Topological Space ◽

Present Article ◽

Design Methodology ◽

Original Work ◽

Generalized Topology ◽

Topological Spaces ◽

Intermediate Structure ◽

Content Type ◽

Completely Regular ◽

Generalized Topological Space

PurposeThe present article deals with the initiation and study of a uniformity like notion, captioned μ-uniformity, in the context of a generalized topological space.Design/methodology/approachThe existence of uniformity for a completely regular topological space is well-known, and the interrelation of this structure with a proximity is also well-studied. Using this idea, a structure on generalized topological space has been developed, to establish the same type of compatibility in the corresponding frameworks.FindingsIt is proved, among other things, that a μ-uniformity on a non-empty set X always induces a generalized topology on X, which is μ-completely regular too. In the last theorem of the paper, the authors develop a relation between μ-proximity and μ-uniformity by showing that every μ-uniformity generates a μ-proximity, both giving the same generalized topology on the underlying set.Originality/valueIt is an original work influenced by the previous works that have been done on generalized topological spaces. A kind of generalization has been done in this article, that has produced an intermediate structure to the already known generalized topological spaces.

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