Abstract
Göçür and Kopuzlu showed that any soft T₄ space, may not be a soft T₂ space (also may not be a soft T₃ space). In this case, they described a new soft separation axiom which is called soft n-T₄ space. Then they indicated that any soft n-T₄ space is soft T₃ space also (Göçür and Kopuzlu, 2015b). In the present paper we showed that if (X,τ,E) is a soft n-T₄ space, topological space (X,τ_e ) is a T₄ space for all e∈ E. Then we indicated that any Soft Metric space is also soft n-T₄ space. Consequently, we indicated that any Soft Metric space ⟹ Soft n-T_4 space ⟹ Soft T_3 space ⟹ Soft T_2 space ⟹ soft T_1 space ⟹ soft T_0 space also.
Keywords
soft metric space soft separation axioms soft set soft closed set soft n- space soft topological space
References
- Atanassov K, 1986. Intuitionistic fuzzy sets. Fuzzy Sets and Systems, 20:87-96.
- Evanzalin E.P and Thangavelu P, 2017. On quasi soft sets in soft topology. GJPAM, 13(12):8343-8359.
- Feng F, Jun YB and. Zhao XZ, 2008. Soft semirings. Comput. Math. Appl, 56:2621-2628.
- Gau WL and Buehrer DJ, 1993. Vague sets. IEEE Trans. System Man Cybernet, 23(2):610-614.
- Gorzalzany MB, 1987. A method of inference in approximate reasoning based on interval valued fuzzy sets. Fuzzy Sets and Systems, 21:1-17.
- Göçür O, 2017. Soft single point space and soft metrizable. Ann. Fuzzy Math. Inform, 13(4):499-507.
- Göçür O, Kopuzlu A, 2015. On soft separation axioms. Ann. Fuzzy Math. Inform, 9(5):817-822.
- Göçür O, Kopuzlu A, 2015. Some new properties on soft separation axioms. Ann. Fuzzy Math. Inform, 9(3):421-429.
- Maji PK, Biswas R and Roy R, 2003. Soft set theory, Comput. Math. Appl, 45:555-562.
- Min WK, 2011. A note on soft topological spaces. Comput. Math. Appl, 62:3524-3528.
- Molodtsov D, 1999. Soft set theory first results. Comput. Math. Appl, 37:19-31.
- Pawlak Z, 1982. Rough sets. Int. J. Comp. Inf. Sci, 11:341-356.
- Shabir M, Naz M, 2011. On soft topological spaces. Comput. Math. Appl, 61:1786-1799.
- Zadeh LA, 1965. Fuzzy sets, Information and Control, 8;338-353.
- Zhang X, 2013. Further Study on Soft Separation Axioms. Computer Engineering and Applications, 49(5):48-50.
Abstract
References
- Atanassov K, 1986. Intuitionistic fuzzy sets. Fuzzy Sets and Systems, 20:87-96.
- Evanzalin E.P and Thangavelu P, 2017. On quasi soft sets in soft topology. GJPAM, 13(12):8343-8359.
- Feng F, Jun YB and. Zhao XZ, 2008. Soft semirings. Comput. Math. Appl, 56:2621-2628.
- Gau WL and Buehrer DJ, 1993. Vague sets. IEEE Trans. System Man Cybernet, 23(2):610-614.
- Gorzalzany MB, 1987. A method of inference in approximate reasoning based on interval valued fuzzy sets. Fuzzy Sets and Systems, 21:1-17.
- Göçür O, 2017. Soft single point space and soft metrizable. Ann. Fuzzy Math. Inform, 13(4):499-507.
- Göçür O, Kopuzlu A, 2015. On soft separation axioms. Ann. Fuzzy Math. Inform, 9(5):817-822.
- Göçür O, Kopuzlu A, 2015. Some new properties on soft separation axioms. Ann. Fuzzy Math. Inform, 9(3):421-429.
- Maji PK, Biswas R and Roy R, 2003. Soft set theory, Comput. Math. Appl, 45:555-562.
- Min WK, 2011. A note on soft topological spaces. Comput. Math. Appl, 62:3524-3528.
- Molodtsov D, 1999. Soft set theory first results. Comput. Math. Appl, 37:19-31.
- Pawlak Z, 1982. Rough sets. Int. J. Comp. Inf. Sci, 11:341-356.
- Shabir M, Naz M, 2011. On soft topological spaces. Comput. Math. Appl, 61:1786-1799.
- Zadeh LA, 1965. Fuzzy sets, Information and Control, 8;338-353.
- Zhang X, 2013. Further Study on Soft Separation Axioms. Computer Engineering and Applications, 49(5):48-50.
Details
| Primary Language | English |
|---|---|
| Subjects | Mathematical Sciences |
| Journal Section | Matematik / Mathematics |
| Authors | |
| Publication Date | June 1, 2019 |
| Submission Date | September 29, 2018 |
| Acceptance Date | November 19, 2018 |
| Published in Issue | Year 2019 Volume: 9 Issue: 2 |