Ranking fuzzy interval numbers in the setting of random sets

We investigate the exceptional set E $ (X, h) associated with the asymptotic formula for the number of primes in short intervals; see Section 1 for the definition. We first obtain two results about the basic structure of this set, proving the inertia and decrease properties; see Theorem 1. Then we t

In this paper, we prove that the bounded set of fuzzy numbers must exist supremum and infimum and give the concrete representation of supremum and infimum. As an application, we obtain that the continuous fuzzy-valued function on a closed interval exists supremum and infimum and give the precise rep

This paper reviews some of the theory of discrete and continuous fuzzy sets or subsets and illustrates, by way of simple examples, some applications to project appraisal in environmental planning. In particular, a more detailed illustration of the application of continuous fuzzy sets (fuzzy numbers)