We investigate an application of a mathematically robust minimization method -- the gradient method -- to the consistencization problem of a pairwise comparisons (PC) matrix. Our approach sheds new light on the notion of a priority vector and leads naturally to the definition of instant priority vectors. We describe a sample family of inconsistency indicators based on various ways of taking an average value, which extends the inconsistency indicator based on the "$\sup$"- norm. We apply this family of inconsistency indicators both for additive and multiplicative PC matrices to show that the choice of various inconsistency indicators lead to non-equivalent consistencization procedures.Comment: 1 figure, several corrections and precision
Abstract Pairwise comparisons between alternatives are a well-known method for measuring preferences...
Abstract A formal proof of convergence of a class of algorithms for reducing inconsistency of pairwi...
In multicriteria decision making, the pairwise comparisons are an useful starting point for determin...
A distance-based inconsistency indicator, defined by the third author for the consistency-driven pai...
Pairwise comparison matrices are increasingly used in settings where some pairs are missing. However...
AbstractThis paper studies the properties of an inconsistency index of a pairwise comparison matrix ...
Incomplete pairwise comparison matrix was introduced by Harker in 1987 for the case in which the dec...
Estimating missing judgements is a key component in many multi-criteria decision making techniques, ...
Pairwise comparison matrices are often used in Multi-attribute Decision Making for weighting the att...
Pairwise comparisons are an important tool of modern (multiple criteria) decision making. Since huma...
Our research focused on testing various characteristics of pairwise comparison (PC) matrices in cont...
Most authors assume that the natural behaviour of the decision-maker is being inconsistent. This pa...
AbstractThe method of pairwise comparisons is widely applied in the decision making process. The inc...
This is a follow up to ”Solution of the least squares method problem of pairwise comparisons matrix”...
Pairwise comparison (PC) matrices are used in multi-attribute decision problems (MADM) in order to e...
Abstract Pairwise comparisons between alternatives are a well-known method for measuring preferences...
Abstract A formal proof of convergence of a class of algorithms for reducing inconsistency of pairwi...
In multicriteria decision making, the pairwise comparisons are an useful starting point for determin...
A distance-based inconsistency indicator, defined by the third author for the consistency-driven pai...
Pairwise comparison matrices are increasingly used in settings where some pairs are missing. However...
AbstractThis paper studies the properties of an inconsistency index of a pairwise comparison matrix ...
Incomplete pairwise comparison matrix was introduced by Harker in 1987 for the case in which the dec...
Estimating missing judgements is a key component in many multi-criteria decision making techniques, ...
Pairwise comparison matrices are often used in Multi-attribute Decision Making for weighting the att...
Pairwise comparisons are an important tool of modern (multiple criteria) decision making. Since huma...
Our research focused on testing various characteristics of pairwise comparison (PC) matrices in cont...
Most authors assume that the natural behaviour of the decision-maker is being inconsistent. This pa...
AbstractThe method of pairwise comparisons is widely applied in the decision making process. The inc...
This is a follow up to ”Solution of the least squares method problem of pairwise comparisons matrix”...
Pairwise comparison (PC) matrices are used in multi-attribute decision problems (MADM) in order to e...
Abstract Pairwise comparisons between alternatives are a well-known method for measuring preferences...
Abstract A formal proof of convergence of a class of algorithms for reducing inconsistency of pairwi...
In multicriteria decision making, the pairwise comparisons are an useful starting point for determin...