2021
DOI: 10.3390/math9172153
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Weaker Forms of Soft Regular and Soft T2 Soft Topological Spaces

Abstract: Soft ω-local indiscreetness as a weaker form of both soft local countability and soft local indiscreetness is introduced. Then soft ω-regularity as a weaker form of both soft regularity and soft ω-local indiscreetness is defined and investigated. Additionally, soft ω-T2 as a new soft topological property that lies strictly between soft T2 and soft T1 is defined and investigated. It is proved that soft anti-local countability is a sufficient condition for equivalence between soft ω-locally indiscreetness (resp.… Show more

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Cited by 16 publications
(16 citation statements)
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“…(Y, µ) is ω 0 -regular but not regular. Thus, by Corollary 10 and Corollary 4 of [37], (Y, τ(µ), B) is soft ω 0 -regular but not soft regular. Now we give an example to show that the converse of Theorem 35 need not be true, in general: Example 12.…”
Section: Discussionmentioning
confidence: 92%
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“…(Y, µ) is ω 0 -regular but not regular. Thus, by Corollary 10 and Corollary 4 of [37], (Y, τ(µ), B) is soft ω 0 -regular but not soft regular. Now we give an example to show that the converse of Theorem 35 need not be true, in general: Example 12.…”
Section: Discussionmentioning
confidence: 92%
“…In this paper, we follow the notions and terminologies as they appear in [23,34,37]. Throughout this paper, ST and STS will denote topological space and soft topological space, respectively.…”
Section: Preliminariesmentioning
confidence: 99%
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“…Then, many topological concepts were modified to include soft topology. The concepts of soft topology and their applications is still a hot area of research (see for example [1,2,[5][6][7][8][9][10][11][12][13][14][15][16][17][18][19]).…”
Section: Introductionmentioning
confidence: 99%
“…(b) [2] soft anti-locally countable for every F ∈ τ − {0 A }, F is not a countable soft set. (c) [5] soft ω-regular whenever S is soft closed and a x ∈1 A − S, then we find K ∈ τ and N ∈ τ ω such that a x ∈K, S ⊆N, and K ∩N = 0 A . Theorem 1 ([4]).…”
Section: Introductionmentioning
confidence: 99%