Abstract
AbstractA rough fuzzy set is the result of approximation of a fuzzy set with respect to a crisp approximation space. In this paper, we investigate topological structures of rough fuzzy sets. We first show that a reflexive crisp rough approximation space can induce a fuzzy Alexandrov space. We then prove that the lower and upper rough fuzzy approximation operators are, respectively, the fuzzy interior operator and fuzzy closure operator if and only if the binary relation in the crisp approximation space is reflexive and transitive. Finally, we examine that a similarity crisp approximation space can produce a fuzzy clopen topological space.KeywordsApproximation operatorsBinary relationsFuzzy topologiesRough fuzzy setsRough sets
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