Consistency adjustments for pairwise comparison matrices

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

Pairwise comparison matrices (PCMs) over an Abelian linearly ordered (alo)-group G = (G, , ≤ ) have been introduced to generalize multiplicative, additive and fuzzy ones and remove some consistency drawbacks. Under the assumption of divisibility of G, for each PCM A = (a ij ), a -mean vector w m (A)

We consider the framework of pairwise comparison matrices over abelian linearly ordered groups. We introduce the notion of -proportionality that allows us to provide new characterizations of the consistency, efÞcient algorithms for checking the consistency and for building a consistent matrix. Moreo

A crucial problem in a decision-making process is the determination of a scale of relative importance for a set X ϭ $x 1 , x 2 , . . . , x n % of alternatives either with respect to a criterion C or an expert E. A widely used tool in Multicriteria Decision Making is the pairwise comparison matrix A

In a multicriteria decision making context, a pairwise comparison matrix A = (a ij ) is a helpful tool to determine the weighted ranking on a set X of alternatives or criteria. The entry a ij of the matrix can assume different meanings: a ij can be a preference ratio (multiplicative case) or a prefe