The article deals with the issues of national aggregated ranking (NAR) of higher education institutions. This case is formulated as a collective choice problem. It is proposed to use voting procedures in small groups that meet the Condorcet principle as aggregation method. The paper applies collective choice rules to the problem under consideration. The alternatives final ordering stability obtained from the Board, Copeland, and Kemeny procedures is illustrated by specific examples. The empirical average was considered as Kemeny median approximate estimate. The example showed Board procedure instability to a slight change in the initial ratings obtained in the rating mechanisms under consideration. Using the voting procedures results described in the paper in small groups on a limited sample containing data from fifteen elements group are presented. The constructed three aggregated rankings proximity degree was estimated using two metricsthe Kendall rank correlation coefficient and the Kemeny distance. Based on a comparative results analysis, it can be concluded that it is appropriate to use collective selection procedures that are well-off in Condorcet when constructing aggregated rating of various organizations, including educational institutions.
The analysis of large-scale business projects is non-dominant alternatives. However, the options under consideration may be too large, and the decision-maker may not be able to apply any mechanism for selecting the best option to this set. Most of the existing decision support procedures involve the entire available alternatives set in the comparison and evaluation process, so they are not suitable in this situation. The paper suggests an effective way to solve this problemthe expert assessments extrapolation method to develop an objective collective solution based on alternatives small training sample expert analysis. In the proposed method version, it is assumed that for any alternatives pair, experts are able to estimate the difference value in their utility. Thus, a difference-classification scale is introduced for alternatives, which makes it possible to more accurately assess the comparative alternatives value and make a more reasonable choice than when using an ordinal scale. This approach advantage also consists in the absence of any some alternatives superiority degrees priori numerical estimates over others, since any such assessment contains certain arbitrariness. The collective choice is based on obtaining generalized criterion parameters estimates using the maximum likelihood principle. In this case, calculating the likelihood function for m-alternatives sample requires determining the multiplicity m-1 of several integrals numerical values over complex geometry region. It is proposed for its calculation to use the Monte-Carlo method. To increase the stability to the maximizing the likelihood function method integration error, we propose numerically-analytical method for calculating target function first and second orders partial derivatives. Simple and visible examples demonstrate the proposed approach effectiveness.
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