| SOME NOTES ON RELATIVELY COMPACT SUBSETS OF FUZZY SETS |
|
Kim, Yun Kyong
(Department of Information Communication Engineering Dongshin University)
Kim, Joo-Mok (School of General Education Semyung University) |
| 1 | V. Kratschmer, Some complete metrics on spaces of fuzzy subsets, Fuzzy Sets and Systems 130 (2002), 357-365. DOI |
| 2 |
M. Ming, Some notes on the characterization of compact sets in ( |
| 3 |
C. Wu and Z. Zhao, Some notes on the characterization of compact sets with |
| 4 | Z. Zhao and C. Wu, The equivalence of convergence of sequences of fuzzy numbers and its applications to the characterization of compact sets, Information Sciences 179 (2009), 3018-3025. DOI |
| 5 | C. Degang, X. Xiaoping and Z. Liangkuan, On the integrable noncompact fuzzy number space, Appl. Math. Lett. 21 (2008), 1260-1266. DOI |
| 6 | P. Diamond and P. Kloeden, Metric spaces of fuzzy sets: Theory and Applications, World Scientific, Singapore, 1994. |
| 7 | T. Fan, On the compactness of fuzzy numbers with sendograph metric, Fuzzy Sets and Systems 143 (2004), 471-477. DOI |
| 8 | G. H. Greco, Sendograph metric and relatively compact sets of fuzzy sets, Fuzzy sets and Systems 157 (2006), 286-291. DOI |
| 9 | G. H. Greco, A characterization of relatively compact sets of fuzzy sets, Nonlinear Anal. 64 (2006), 518-529. DOI |
| 10 | G. H. Greco and M. P. Moschen, Supremum metric and relatively compact sets of fuzzy sets, Nonlinear Anal. 64 (2006), 1325-1335. DOI |
| 11 | S. Y. Joo and Y. K. Kim, Topological properties on the space of fuzzy sets, Jour. Math. Anal. Appl. 246 (2000), 576-590. DOI |
| 12 |
Y. K. Kim, Some notes on |
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