Epimorphisms in categories of separated fuzzy topological spaces

@article{Alderton1993EpimorphismsIC,
  title={Epimorphisms in categories of separated fuzzy topological spaces},
  author={I. W. Alderton and G. Castellini},
  journal={Fuzzy Sets and Systems},
  year={1993},
  volume={56},
  pages={323-330}
}
Abstract The categorical theory of closure operators is used to characterize the epimorphisms in certain categories of separated fuzzy topological spaces (in the sense of Lowen). These include the 0 ∗ -T 0 -spaces of Wuyts and Lowen, the FT S -spaces of Ghanim, Kerre and Mashhour, and the α -T 2 -spaces of Rodabaugh. 
8 Citations
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References

SHOWING 1-10 OF 29 REFERENCES
Function spaces in fuzzy topology
The Hausdorff separation axiom for fuzzy topological spaces
Closure operators and connectedness
The epireflective hull of the Sierpinski object in FTS
Fuzzy topological spaces and fuzzy compactness
On local and global measures of separation in fuzzy topological spaces
Bases of topological epi-reflections
Closure Operators and Polarities a
Fuzzy Sierpinski space
Initial and Final Fuzzy Topologies and the Fuzzy Tychonoff Theorem
...
1
2
3
...