Ranking fuzzy numbers with maximizing set and minimizing set

Ranking alternatives (both qualitative as well as quantitative) in a multicriterion environment, employing experts opinion (preference structure) using fuzzy numbers and linguistic variables, are presented in this paper. Fuzzy weights (#i) of alternatives (Ai) are computed using standard fuzzy arith

Fuzzy sets theory may be used to solve multiple-attribute decision problems under uncertainty. Key Word index--Decision theory; fuzzy sets; rating; multiple-attribute decision problems; multiple-objective decision problems. Snmmm'y--A method is proposed to deal with multiplealternative decision pr

This is a subsequent paper of [9]. By using the concepts of fuzzy number fuzzy measures [9] and fuzzy-valued functions [10], a theory of fuzzy integrals of fuzzy-valued functions with respect to fuzzy number fuzzy measures is built up. So far, it is a more general one following Sugeno's [5].

Ranked set sampling (RSS), as suggested by McIntyre (1952), assumes perfect ranking, i.e. without errors in ranking, but for most practical applications it is not easy to rank the units without errors in ranking. As pointed out by Dell and Clutter (1972) there will be a loss in precision due to the