Fuzzy limit spaces (Q582612)

The author introduces the categories of fuzzy limit spaces and Wong-fuzzy limit spaces and shows that they are cartesian closed topological categories which contain the category of fuzzy topological spaces (of limit spaces) as bireflective (as bicoreflective) subcategory. Here, a fuzzy limitierung is a map from the set of all fuzzy points in a set X into the power set of the set of all prefilters on X which yields a `good' generalization of fuzzy topology and of limitierung (in the sense of Fischer). The two kinds of convergence of prefilters arise from the definition of ``fuzzy point'' and ``p\(\in A''\) for a fuzzy point p and a fuzzy set A: 1. the author's definition: \(p(x_ 0)=\lambda\), \(0<\lambda \leq 1\), \(p(x)=0\) if \(x\neq x_ 0\) and \(p\in A\) if \(1-\lambda <A(x_ 0)\). 2. Wong's definition: \(p(x_ 0)=\lambda\), \(0<\lambda <1\), \(p(x)=0\) if \(x\neq x_ 0\) and \(p\in A\) if \(\lambda <A(x_ 0)\).