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.
soft metric space soft separation axioms soft set soft closed set soft n- space soft topological space
Primary Language | English |
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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 |