We consider a decision-making problem to find absolute ratings of alternatives that are compared in pairs under multiple criteria, subject to constraints in the form of two-sided bounds on ratios between the ratings. Given matrices of pairwise comparisons made according to the criteria, the problem is formulated as the log-Chebyshev approximation of these matrices by a common consistent matrix (a symmetrically reciprocal matrix of unit rank) to minimize the approximation errors for all matrices simultaneously. We rearrange the approximation problem as a constrained multiobjective optimization problem of finding a vector that determines the approximating consistent matrix. The problem is then represented in the framework of tropical algebra,...
International audienceSatisfying consistency requirements of pairwise comparison matrix (PCM) is a c...
Decision-making often refers to ranking alternatives based on many involved criteria. Since the intr...
International audienceCombinatorial optimization problems serve as models for a great number of real...
summary:We consider a decision-making problem to evaluate absolute ratings of alternatives that are ...
In the paper, an approach to the problem of rank-one approximation of positive matrices in the Cheby...
Low-rank matrix approximation finds wide application in the analysis of big data, in recommendation ...
Tropical linear algebra is the study of classical linear algebra problems with arithmeticdone over t...
In several methods of multiattribute decision making, pairwise comparison matrices are applied to de...
The problem of rank-one factorization of positive matrices with missing (unspecified) entries is co...
In several methods of multiattribute decision making pairwise comparison matrices are applied to der...
Some multiple-criteria decision making methods rank actions by associating weights to the different ...
This paper proposes a new method for calculating the missing elements of an incomplete matrix of pai...
The aim of the paper is to present a new global optimization method for determining all the optima ...
The aim of the paper is to present a new global optimization method for determining all the optima o...
The authors propose a general technique called solution decomposition to devise approximation algori...
International audienceSatisfying consistency requirements of pairwise comparison matrix (PCM) is a c...
Decision-making often refers to ranking alternatives based on many involved criteria. Since the intr...
International audienceCombinatorial optimization problems serve as models for a great number of real...
summary:We consider a decision-making problem to evaluate absolute ratings of alternatives that are ...
In the paper, an approach to the problem of rank-one approximation of positive matrices in the Cheby...
Low-rank matrix approximation finds wide application in the analysis of big data, in recommendation ...
Tropical linear algebra is the study of classical linear algebra problems with arithmeticdone over t...
In several methods of multiattribute decision making, pairwise comparison matrices are applied to de...
The problem of rank-one factorization of positive matrices with missing (unspecified) entries is co...
In several methods of multiattribute decision making pairwise comparison matrices are applied to der...
Some multiple-criteria decision making methods rank actions by associating weights to the different ...
This paper proposes a new method for calculating the missing elements of an incomplete matrix of pai...
The aim of the paper is to present a new global optimization method for determining all the optima ...
The aim of the paper is to present a new global optimization method for determining all the optima o...
The authors propose a general technique called solution decomposition to devise approximation algori...
International audienceSatisfying consistency requirements of pairwise comparison matrix (PCM) is a c...
Decision-making often refers to ranking alternatives based on many involved criteria. Since the intr...
International audienceCombinatorial optimization problems serve as models for a great number of real...