On type-2 m-topological spaces

AbstractIn the present paper, we define a notion of an m2-topological space by introducing a count of openness of a multiset (mset in short) and study the properties of m2-subspaces, mgp-maps etc. Decomposition theorems involving m-topologies and m2-topologies are established. The behaviour of the functional image and functional preimage of an m2-topologies, the continuity of the identity mapping and a constant mapping in m2-topologies are also examined.

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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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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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Study of a Forwarding Chain in the Category of Topological Spaces between T0 and T2 with respect to One Point Compactification Operator

Chinese Journal of Mathematics ◽

10.1155/2014/541538 ◽

2014 ◽

Vol 2014 ◽

pp. 1-10 ◽

Cited By ~ 1

Author(s):

Fatemah Ayatollah Zadeh Shirazi ◽

Meysam Miralaei ◽

Fariba Zeinal Zadeh Farhadi

Keyword(s):

Topological Space ◽

Topological Spaces ◽

The One ◽

One Point Compactification

In the following text, we want to study the behavior of one point compactification operator in the chain Ξ := {Metrizable, Normal, T2, KC, SC, US, T1, TD, TUD, T0, Top} of subcategories of category of topological spaces, Top (where we denote the subcategory of Top, containing all topological spaces with property P , simply by P). Actually we want to know, for P∈Ξ and X∈P, the one point compactification of topological space X belongs to which elements of Ξ. Finally we find out that the chain {Metrizable, T2, KC, SC, US, T1, TD, TUD, T0, Top} is a forwarding chain with respect to one point compactification operator.

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Orderability of topological spaces by continuous preferences

International Journal of Mathematics and Mathematical Sciences ◽

10.1155/s0161171201007219 ◽

2001 ◽

Vol 27 (8) ◽

pp. 505-512 ◽

Cited By ~ 3

Author(s):

José Carlos Rodríguez Alcantud

Keyword(s):

Topological Space ◽

Topological Spaces ◽

Topological Properties ◽

Linear Orders ◽

Mathematical Economics

We extend van Dalen and Wattel's (1973) characterization of orderable spaces and their subspaces by obtaining analogous results for two larger classes of topological spaces. This type of spaces are defined by considering preferences instead of linear orders in the former definitions, and possess topological properties similar to those of (totally) orderable spaces (cf. Alcantud, 1999). Our study provides particular consequences of relevance in mathematical economics; in particular, a condition equivalent to the existence of a continuous preference on a topological space is obtained.

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A Tychonoff theorem in intuitionistic fuzzy topological spaces

International Journal of Mathematics and Mathematical Sciences ◽

10.1155/s0161171204403603 ◽

2004 ◽

Vol 2004 (70) ◽

pp. 3829-3837

Author(s):

Doğan Çoker ◽

A. Haydar Eş ◽

Necla Turanli

Keyword(s):

Topological Space ◽

Fuzzy Set ◽

Intuitionistic Fuzzy Set ◽

Topological Spaces ◽

Fuzzy Topology ◽

Intuitionistic Fuzzy ◽

Fuzzy Topological Space ◽

Fuzzy Topological Spaces ◽

Tychonoff Theorem

The purpose of this paper is to prove a Tychonoff theorem in the so-called “intuitionistic fuzzy topological spaces.” After giving the fundamental definitions, such as the definitions of intuitionistic fuzzy set, intuitionistic fuzzy topology, intuitionistic fuzzy topological space, fuzzy continuity, fuzzy compactness, and fuzzy dicompactness, we obtain several preservation properties and some characterizations concerning fuzzy compactness. Lastly we give a Tychonoff-like theorem.

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Connectedness of ideal topological spaces

Filomat ◽

10.2298/fil1504661m ◽

2015 ◽

Vol 29 (4) ◽

pp. 661-665 ◽

Cited By ~ 3

Author(s):

Shyamapada Modak ◽

Takashi Noiri

Keyword(s):

Topological Space ◽

Topological Spaces

In this paper we introduce and study of new types of connectedness in an ideal topological space. We also interrelate these connectedness with connectedness which are already in literature.

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On omega-Connectedness and omega-Continuity in the Product Space

European Journal of Pure and Applied Mathematics ◽

10.29020/nybg.ejpam.v11i3.3293 ◽

2018 ◽

Vol 11 (3) ◽

pp. 834-843 ◽

Cited By ~ 1

Author(s):

Mhelmar Avila Labendia ◽

Jan Alejandro C. Sasam

Keyword(s):

Topological Space ◽

Product Space ◽

Topological Spaces

In this paper, the concepts of $\omega$-open and $\omega$-closed functions between topological spaces will be introduced and characterized. Moreover, related concepts such as $\omega$-connectedness and $\omega$-continuity from an arbitarary topological space into the product space will also be characterized.

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Topological Games on Product Spaces and its Fuzzification

Academic Voices A Multidisciplinary Journal ◽

10.3126/av.v2i1.8278 ◽

2013 ◽

Vol 2 ◽

pp. 11-15

Author(s):

Bidyanand Prasad ◽

BP Kumar

Keyword(s):

Topological Space ◽

Set Theory ◽

Fuzzy Set ◽

Fuzzy Set Theory ◽

Perfect Information ◽

Topological Spaces ◽

Product Spaces ◽

Pursuit And Evasion

This paper is concerned with the introduction of an infinite positional game of pursuit and evasion over an ideal of a topological space. A topological game has been played over some new D-product and C-product spaces of two Hausdorff topological spaces. Perfect information, decisions and goals in a game may not be feasible. Hence, fuzzy set theory has been applied in this paper to obtain better results. Academic Voices, Vol. 2, No. 1, 2012, Pages 11-15 DOI: http://dx.doi.org/10.3126/av.v2i1.8278

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