summary:We consider a decision-making problem to evaluate absolute ratings of alternatives that are compared in pairs according to two criteria, subject to box constraints on the ratings. The problem is formulated as the log-Chebyshev approximation of two pairwise comparison matrices by a common consistent matrix (a symmetrically reciprocal matrix of unit rank), to minimize the approximation errors for both matrices simultaneously. We rearrange the approximation problem as a constrained bi-objective optimization problem of finding a vector that determines the approximating consistent matrix, and then represent the problem in terms of tropical algebra. We apply methods and results of tropical optimization to derive an analytical solution of ...
Decision-making often refers to ranking alternatives based on many involved criteria. Since the intr...
Pairwise comparison matrices (PCMs) have been a long standing technique for comparing alternatives/c...
In a Multicriteria Decision Making context, a pairwise comparison matrix $A=(a_{ij})$ is a helpful ...
We consider a decision-making problem to find absolute ratings of alternatives that are compared in ...
In several methods of multiattribute decision making, pairwise comparison matrices are applied to de...
summary:The pairwise comparison method is an interesting technique for building a global ranking fro...
EnWe present a general approach to pairwise comparison matrices and introduce a consistency index th...
AbstractConsistency retrieval from a biased relative preference table is an imperative task in decis...
In several methods of multiattribute decision making pairwise comparison matrices are applied to der...
This paper proposes a new method for calculating the missing elements of an incomplete matrix of pai...
Pairwise comparison (PC) matrices are used in multi-attribute decision problems (MADM) in order to e...
AbstractThe algorithm for finding a consistent approximation to an inconsistent pairwise comparisons...
Pairwise comparisons have been a long standing technique for comparing alternatives/criteria and the...
In this paper we study approximation methods for solving bi-criteria optimization problems. Initi...
Pairwise comparison matrices are often used in Multi-attribute Decision Making forweighting the attr...
Decision-making often refers to ranking alternatives based on many involved criteria. Since the intr...
Pairwise comparison matrices (PCMs) have been a long standing technique for comparing alternatives/c...
In a Multicriteria Decision Making context, a pairwise comparison matrix $A=(a_{ij})$ is a helpful ...
We consider a decision-making problem to find absolute ratings of alternatives that are compared in ...
In several methods of multiattribute decision making, pairwise comparison matrices are applied to de...
summary:The pairwise comparison method is an interesting technique for building a global ranking fro...
EnWe present a general approach to pairwise comparison matrices and introduce a consistency index th...
AbstractConsistency retrieval from a biased relative preference table is an imperative task in decis...
In several methods of multiattribute decision making pairwise comparison matrices are applied to der...
This paper proposes a new method for calculating the missing elements of an incomplete matrix of pai...
Pairwise comparison (PC) matrices are used in multi-attribute decision problems (MADM) in order to e...
AbstractThe algorithm for finding a consistent approximation to an inconsistent pairwise comparisons...
Pairwise comparisons have been a long standing technique for comparing alternatives/criteria and the...
In this paper we study approximation methods for solving bi-criteria optimization problems. Initi...
Pairwise comparison matrices are often used in Multi-attribute Decision Making forweighting the attr...
Decision-making often refers to ranking alternatives based on many involved criteria. Since the intr...
Pairwise comparison matrices (PCMs) have been a long standing technique for comparing alternatives/c...
In a Multicriteria Decision Making context, a pairwise comparison matrix $A=(a_{ij})$ is a helpful ...