Title :
Measure theory on granular fuzzy sets
Author_Institution :
Dept. of Math. & Comput. Sci., San Jose State Univ., CA, USA
Abstract :
A granular fuzzy set theory is modeled on fuzzy sets whose membership functions are defined on sets of sets (granules). The grade is interpreted literally; for example, that the grade of x is 1/2 means one half of the granule x belongs to the fuzzy set. By taking the union of these subgranules, one get a crisp set representation of a fuzzy set. In other words, a granular fuzzy set is a fuzzy set that has a crisp set representation. A measure theory based on such granular fuzzy sets is developed. The measure theory of crisp sets is imported to fuzzy sets via their crisp representations. Using such a notion, a belief function can be shown to be the inner probability of a probability theory of fuzzy sets
Keywords :
belief maintenance; fuzzy set theory; rough set theory; belief function; crisp set representation; granular fuzzy sets; granules; measure theory; membership functions; probability theory; Computer science; Estimation theory; Fuzzy set theory; Fuzzy sets; Mathematical model; Mathematics; Rough sets; Set theory; Size measurement; Terminology;
Conference_Titel :
Fuzzy Information Processing Society, 1999. NAFIPS. 18th International Conference of the North American
Conference_Location :
New York, NY
Print_ISBN :
0-7803-5211-4
DOI :
10.1109/NAFIPS.1999.781806
