Consistency for uncertainty measures

We propose new measures of consistency of additive and multiplicative pairwise comparison matrices. These measures, the relati6e consistency and relati6e error, are easy to compute and have clear and simple algebraic and geometric meaning, interpretation and properties. The correspondence between th

In Part I we discussed limitations of two measures of global (non-fuzzy) uncertainty of Lamata and Moral, and a measure of total (non-fury) uncertainty due to Klir and Ramer and established the need for a new measure. In this paper we propose a set of intuitively desirable axioms for a measure of to

We extend previous work of Lehrer and Wagner, and of McConway, on the consensus of probabilities, showing under axioms similar to theirs that (1) a belief function consensus of belief functions on a set with at least three members and (2) a belief function consensus of Bayesian belief functions on a