Fuzzy decision making including unequal objectives

Concave properties play a dominate role in solving both classic and fuzzy optimization problems. However, since fuzzy problems are generally represented by sets, not crisp numbers, various aggregation schemes are needed to manipulate and to combine the different elements in a fuzzy optimization prob

The construction of evaluation functions to compare alternatives in decision making under uncertainty is the central focus of this work. The importance of the decision makers' attitude with respect to their view of the temperament of uncertainty is stressed as a signi®cant component in the formulati

The basic operations of fuzzy sets, such as negation, intersection, and union, usually are computed by applying the one-complement, minimum, and maximum operators to the membership functions of fuzzy sets. However, different decision agents may have different perceptions for these fuzzy operations.

This paper proposes a hierarchical procedure for solving decision problems with multiple objectives. The procedure consists of two levels, a top-and a base-level. The main idea is that the top-level only provides general preference information. Taking this information into account the base-level the