Abstract
Mathematical models describing physical, technical, economic, and other processes can be used to analyze these processes and predict their results, providing that these models are stable and their results are stable relative to the model parameters used. Small changes in the values of the model parameters correspond to small changes in the results. Multicriteria decision-making models need to check the results’ stability against the models’ main components: the values of the criteria weights and the elements of the decision matrix. In this article, we study the stability of models associated with the calculation of criteria weights. For the analysis, the most commonly used models are taken—the Analytic Hierarchy Process (AHP) method and the fuzzy Analytic Hierarchy Process (FAHP) method, in which fuzzy numbers are used under conditions of data uncertainty. Both mathematically well-based methods verify the consistency of the expert evaluations. The method of statistical simulation (Monte Carlo) is the basis for studying the results’ stability. The study checks the experts’ provided evaluations’ consistency, calculates the criteria weights, and evaluates their relative errors after a slight change in the estimates of the pairwise comparisons of the criteria provided by the experts. The matrix of comparisons of the FAHP method is constructed based on the entire expert group’s assessments. It estimates the boundaries of variance in the fuzzy criteria weights. This paper estimates the stability of the criteria’ weights associated with the mathematical methods themselves and the experts’ estimates. The results are useful to study the stability of specific MCDM methods when ranking alternatives.
Highlights
A mathematical model makes practical sense if its results are stable concerning the model parameters
Components of Multicriteria Decision-Making (MCDM) models are represented by the criteria characterizing the process under evaluation, and these criteria’ weights
The stability of multicriteria MCDM methods is associated with the incomplete certainty of the data used for calculations
Summary
A mathematical model makes practical sense if its results are stable concerning the model parameters. If an insignificant variation in the values of the resulting characteristics of the model corresponds to slight variations in the model parameters. Components of Multicriteria Decision-Making (MCDM) models are represented by the criteria characterizing the process under evaluation, and these criteria’ weights. Given that the use of criteria weights in MCDM methods has an essential influence on the result of the evaluations and on the making of the proper decision, an investigation of the accuracy of such evaluations is interesting and important from both the theoretical and the practical point of view. This paper contains an investigation of the stability of the evaluations of the subjective weights of the criteria and the influence of data uncertainty upon the results
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