Abstract
In the present paper, we introduced topological notions defined by means of regular open sets when these are planted into the framework of Ying's fuzzifying topological spaces (in Lukasiewicz fuzzy logic). We used fuzzy logic to introduce almost separation axioms \(T_{0}^{R}\)-, \(T_{1}^{R}\)-, \(T_{2}^{R}\) (almost Hausdorff)-, \(T_{3}^{R}\) (almost-regular)- and \(T_{4}^{R}\) (almost-normal). Furthermore, the \(R_{0}^{R}\)- and \(R_{1}^{R}\)-separation axioms have been studied and their relations with the \(T_{1}^{R}\)- and \(T_{2}^{R}\)-separation axioms have been introduced. Moreover, we gave the relations of these axioms with each other as well as the relations with other fuzzifying separation axioms.
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