Stable subconstructs of FTS: Part II

“…The importance of the existence of nontrivial both initially and finally full subconstructs of L-FTS lies in that, as observed by Lowen and Wuyts [24], each such subconstruct of FTS gives rise to a perfectly viable and natural autonomous theory of fuzzy topology." Putting this differently, fuzzy topology should consist of a system of closely related theories of topology, each such theory applying to a subuniverse of L-FTS.…”

“…In the case L = 0 1 , Lowen and Wuyts [23,24] proved that L-FTS contains many such subconstructs, and a nice characterization and classification theorem of these subconstructs was also presented in their papers. For a general completely distributive lattice L, L-FTS also has nontrivial both initially and finally closed full subconstructs other than ω L Top ; for example, the construct of Lowen spaces in [18] is one of such subconstruct.…”

“…Then easily L is a total L-fuzzy topology on L. Moreover, L = ω L S where S denotes the Scott topology on L. It is easy to check that ω L Top =Stab( L [19,23].…”

“…Let N be the L-fuzzy topology on L generated by σ ∈ L σ ≤ id L ∪ constants , then N is a total L-fuzzy topology on L and Stab N is the construct of Lowen spaces [18]. Particularly when L = 0 1 , Stab N ) is the construct FNS of fuzzy neighbourhood spaces [23].…”

Some Categorical Aspects of Fuzzy Topology

“…The importance of the existence of nontrivial both initially and finally full subconstructs of L-FTS lies in that, as observed by Lowen and Wuyts [24], each such subconstruct of FTS gives rise to a perfectly viable and natural autonomous theory of fuzzy topology." Putting this differently, fuzzy topology should consist of a system of closely related theories of topology, each such theory applying to a subuniverse of L-FTS.…”

“…In the case L = 0 1 , Lowen and Wuyts [23,24] proved that L-FTS contains many such subconstructs, and a nice characterization and classification theorem of these subconstructs was also presented in their papers. For a general completely distributive lattice L, L-FTS also has nontrivial both initially and finally closed full subconstructs other than ω L Top ; for example, the construct of Lowen spaces in [18] is one of such subconstruct.…”

“…Then easily L is a total L-fuzzy topology on L. Moreover, L = ω L S where S denotes the Scott topology on L. It is easy to check that ω L Top =Stab( L [19,23].…”

“…Let N be the L-fuzzy topology on L generated by σ ∈ L σ ≤ id L ∪ constants , then N is a total L-fuzzy topology on L and Stab N is the construct of Lowen spaces [18]. Particularly when L = 0 1 , Stab N ) is the construct FNS of fuzzy neighbourhood spaces [23].…”

Some Categorical Aspects of Fuzzy Topology

“…Since this is true for any increasing homeomorphism on the unit interval, it is natural to look at fuzzy topologies which are invariant under such operations, in the sense that for any increasing homeomorphism cp : I + I, cp o A c A, and to try and discover precisely what these fuzzy topologies look like. The techniques developed in [3] and [12] are perfectly suited for this purpose. In this paper we then also describe the total fuzzy topology generated by the set of all increasing homeomorphisms on the unit interval, and derive a characterization of the, hence simultaneously bireflective and bicoreflective, subconstruct of FTS consisting of objects with fuzzy topologies stable under increasing homeomorphisms in the above sense.…”

Stability under Homeomorphisms in FTS

Axiomatic Foundations Of Fixed-Basis Fuzzy Topology