Separation Axioms (T1) on Fuzzy Bitopological Spaces in Quasi-Coincidence Sense

Separation Axioms (T1) on Fuzzy Bitopological Spaces in Quasi-Coincidence Sense

In this paper, we introduce some new definitions of Ti separation on fuzzy bitopological space in quasi-coincidence sense and establish relations among them and their counterparts. We show that the notions satisfy good extension, hereditary, productive and projective properties. We present their one...

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Veröffentlicht in:International journal of mathematical combinatorics 2019-09, Vol.3, p.43-53
Hauptverfasser: Miah, Saikh Shahjahan, Amin, M R, Hoque, Md Fazlul
Format: Artikel
Sprache:eng
Schlagworte:
Axioms
Coincidence circuits
Fuzzy sets
Liu Ying
Mapping
Mathematics
Measurement
Separation
Studies
Topology
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Zusammenfassung:In this paper, we introduce some new definitions of Ti separation on fuzzy bitopological space in quasi-coincidence sense and establish relations among them and their counterparts. We show that the notions satisfy good extension, hereditary, productive and projective properties. We present their one-one, onto, fuzzy open and fuzzy continuous mappings. In addition, we also discuss the initial and final fuzzy bitopological spaces in quasi-coincidence sense.
ISSN:1937-1055
1937-1047