Abstract and concrete categories
Abstract and concrete categories
Pointwise uniformities in fuzzy set theory
Fuzzy Sets and Systems
L-proximities and totally bounded pointwise L-uniformities
Fuzzy Sets and Systems - Topology
Stratified Hutton uniform spaces
Fuzzy Sets and Systems - Mathematics
Sums of L-fuzzy topological spaces
Fuzzy Sets and Systems
Generated I-fuzzy topological spaces
Fuzzy Sets and Systems
Stratified (L,M)-fuzzy quasi-uniform spaces
Computers & Mathematics with Applications
Journal of Intelligent & Fuzzy Systems: Applications in Engineering and Technology
| Hi-index | 0.20 |
An (L,M)-fuzzy topology is a graded extension of topological spaces handling M-valued families of L-fuzzy subsets of a referential, where L and M are completely distributive lattices. When M reduces to the set 2={0,1}, a (2,M)-fuzzy topology is called a fuzzifying topology after Ying. Sostak introduced the notion (L,M)-fuzzy uniform spaces. The aim of this paper is to study the relationship between (2,M)-fuzzy quasi-uniform spaces and (L,M)-fuzzy quasi-uniform spaces as well as the relationship between (2,M)-fuzzy quasi-uniform spaces and pointwise (L,M)-fuzzy quasi-uniform spaces-the extension of Shi's L-quasi-uniform space in a Kubiak-Sostak sense. It is shown that the category of (2,M)-fuzzy quasi-uniform spaces can be embedded in the category of stratified (L,M)-fuzzy quasi-uniform spaces as a both reflective and coreflective full subcategory; and the former category can also be embedded in the category of pointwise (L,M)-fuzzy quasi-uniform spaces.