METHOD FOR WEIGHTS CALCULATION BASED ON INTERVAL MULTIPLICATIVE PAIRWISE COMPARISON MATRIX IN DECISIONMAKING MODELS

N. I. Nedashkovskaya

doi:10.15588/1607-3274-2022-3-15

Authors

N. I. Nedashkovskaya Institute for Applied Systems Analysis at National Technical University of Ukraine “Igor Sikorsky Kyiv Polytechnic Institute”, Kyiv, Ukraine, Ukraine

DOI:

https://doi.org/10.15588/1607-3274-2022-3-15

Keywords:

interval multiplicative pairwise comparison matrix, consistency, expert judgements, fuzzy preference programming, decision support systems.

Abstract

Context. The pairwise comparison method is a component of several decision support methodologies such as the analytic hierarchy and network processes (AHP, ANP), PROMETHEE, TOPSIS and other. This method results in the weight vector of elements of decision-making model and is based on inversely symmetrical pairwise comparison matrices. The evaluation of the elements is carried out mainly by experts under conditions of uncertainty. Therefore, modifications of this method have been explored in recent years, which are based on fuzzy and interval pairwise comparison matrices (IPCMs).

Objective. The purpose of the work is to develop a modified method for calculation of crisp weights based on consistent and inconsistent multiplicative IPCMs of elements of decision-making model.

Method. The proposed modified method is based on consistent and inconsistent multiplicative IPCMs, fuzzy preference programming and results in more reliable weights for the elements of decision-making model in comparison with other known methods. The differences between the proposed method and the known ones are as follows: coefficients that characterize extended intervals for ratios of weights are introduced; membership functions of fuzzy preference relations are proposed, which depend on values of IPCM elements. The introduction of these coefficients and membership functions made it possible to prove the statement about the required coincidence of the calculated weights based on the “upper” and “lower” models. The introduced coefficients can be further used to find the most inconsistent IPCM elements.

Results. Experiments were performed with several IPCMs of different consistency level. The weights on the basis of the considered consistent and weakly consistent IPCMs obtained using the proposed and other known methods have determined the same rankings of the compared objects. Therefore, the results using the proposed method on the basis of such IPCMs do not contradict the results obtained for these types of IPCMs using other known methods. Rankings by the proposed method based on the considered highly inconsistent IPCMs are much closer to rankings based on the corresponding initial undisturbed IPCMs in comparison with rankings obtained using the known FPP method. The most inconsistent elements in the considered IPCMs are found.

Conclusions. The developed method has shown its efficiency, results in more reliable weights and can be used for a wide range of decision support problems, scenario analysis, priority calculation, resource allocation, evaluation of decision alternatives and criteria in various application areas.

Author Biography

N. I. Nedashkovskaya, Institute for Applied Systems Analysis at National Technical University of Ukraine “Igor Sikorsky Kyiv Polytechnic Institute”, Kyiv, Ukraine

Dr. Sc., Associate Professor at the Department of Mathematical Methods of System Analysis

References

Larichev O. I. Science and Art of Decision Making. Moscow, Nauka Publisher, 1979, 200 p. (in Russian).

Larichev O. I., Moshkovich H. M., Rebrik S. B. Systematic research into human behavior in multiattribute object classification problems, Acta Psychologica, 1988, Vol. 68, Issue 1–3, pp. 171–182. DOI: 10.1016/0001-6918(88)90053-4

Simon H. A. The architecture of complexity, Proceedings of the American Philosophical Society, 1962, Vol. 106, Issue 6. pp. 467–482. https://www.jstor.org/stable/985254

Saaty T. L. The Analytic Hierarchy Process. New York, McGraw-Hill, 1980.

Saaty T. L. The modern science of multicriteria decision making and its practical applications: The AHP/ANP approach, Operations Research, 2013, Vol. 61, Issue 5, pp. 1101–1118. DOI: 10.1287/opre.2013.1197

Bernasconi M.б Choirat C., Seri R. The analytic hierarchy process and the theory of measurement, Management Science, 2010, Vol. 56, Issue 4, pp. 699–711. DOI: 10.1287/mnsc.1090.1123

Vaidya O. S., Kumar S. Analytic hierarchy process: An overview of applications, European Journal of Operational Research, 2006, Vol. 169, Issue 1, pp. 1–29. DOI: 10.1016/j.ejor.2004.04.028

Brunelli M. Introduction to the Analytic Hierarchy Process. New York, Springer, 2015, 83 p. DOI: 10.1007/978-3-31912502-2

Titenko E. A., Frolov N. S., Khanis A. L. et al. Models for calculation weights for estimation innovative technical objects, Radio Electronics, Computer Science, Control, 2020, No. 3, pp. 181 – 193. DOI: 10.15588/1607-3274-2020-3-17

Melnyk K. V., Hlushko V. N., Borysova N. V. Decision support technology for sprint planning, Radio Electronics, Computer Science, Control, 2020, No. 1, pp. 135–145. DOI: 10.15588/1607-3274-2020-1-14

Rezaei J. Best-worst multi-criteria decision-making method: Some properties and a linear model, Omega, 2016, Vol. 64. pp. 126–130. DOI: 10.1016/j.omega.2015.12.001

Gwo-Hshiung T., Huang J.-J. Multiple Attribute Decision Making: Methods and Applications. New York, Chapman and Hall, 2011, 352 p. DOI : 10.1201/b11032

Nedashkovskaya N. I. Method for Evaluation of the Uncertainty of the Paired Comparisons Expert Judgements when Calculating the Decision Alternatives Weights, Journal of Automation and Information Sciences, 2015, Vol. 47, Issue 10, pp. 69–82. DOI: 10.1615/JAutomatInfScien.v47.i10.70

Durbach I., Lahdelma R., Salminen P. The analytic hierarchy process with stochastic judgements, European Journal of Operational Research, 2014, Vol. 238, No. 2, pp. 552– 559. DOI: 10.1016/j.ejor.2014.03.045

Wang Y.-M., Chin K.-S. An eigenvector method for generating normalized interval and fuzzy weights, Applied Mathematics and Computation, 2006, Vol. 181, pp. 1257– 1275. DOI: 10.1016/j.amc.2006.02.026

Krejčí J. Fuzzy eigenvector method for obtaining normalized fuzzy weights from fuzzy pairwise comparison matrices, Fuzzy Sets and Systems, 2017, Vol. 315, pp. 26–43. DOI: 10.1016/j.fss.2016.03.006

Ramík J. Deriving priority vector from pairwise comparisons matrix with fuzzy elements, Fuzzy Sets and Systems, 2021, Vol. 422, pp. 68–82. DOI: 10.1016/j.fss.2020.11.022

Mikhailov L. Deriving priorities from fuzzy pairwise comparison judgements, Fuzzy Sets and Systems, 2003, Vol. 134, Issue 3, pp. 365–385. DOI: 10.1016/S01650114(02)00383-4

Mikhailov L. A fuzzy approach to deriving priorities from interval pairwise comparison judgements, European Journal of Operational Research, 2004, Vol.159, Issue 3, pp. 687– 704. DOI: 10.1016/S0377-2217(03)00432-6

Sugihara K., Ishii H., Tanaka H. Interval priorities in AHP by interval regression analysis, European Journal of Operational Research, 2004, Vol. 158, pp. 745–754. DOI: 10.1016/S0377-2217(03)00418-1

Wang Y.-M., Yang J.-B., Xu D.-L. A two-stage logarithmic goal programming method for generating weights from interval comparison matrices, Fuzzy Sets and Systems, 2005, Vol. 152, Issue 3, pp. 475–498. DOI: 10.1016/j.fss.2004.10.020

Wang Y.-M., Elhag T. M. S. A goal programming method for obtaining interval weights from an interval comparison matrix, European Journal of Operational Research, 2007, Vol. 177, Issue 1, pp. 458–471. DOI: 10.1016/j.ejor.2005.10.066

Liu F. Acceptable consistency analysis of interval reciprocal comparison matrices, Fuzzy Sets and Systems, 2009, Vol. 160, Issue 18, pp. 2686–2700. DOI: 10.1016/j.fss.2009.01.010

Entani T., Inuiguchi M. Pairwise comparison based interval analysis for group decision aiding with multiple criteria, Fuzzy Sets and Systems, 2015, Vol. 274, pp. 79–96. DOI: 10.1016/j.fss.2015.03.001

Pankratova N. D., Nedashkovskaya N. I. Estimation of decision alternatives on the basis of interval pairwise comparison matrices, Intelligent Control and Automation, 2016, Vol. 7, Issue 2, pp. 39–54. DOI: 10.4236/ica.2016.72005

Li K. W., Wang Z.-J., Tong X. Acceptability analysis and priority weight elicitation for interval multiplicative comparison matrices, European Journal of Operational Research, 2016, Vol. 250, Issue 2, pp. 628–638. DOI: 10.1016/j.ejor.2015.09.010

Nedashkovskaya N. I. Investigation of methods for improving consistency of a pairwise comparison matrix, Journal of the Operational Research Society, 2018, Vol. 69, Issue 12, pp. 1947–1956. DOI: 10.1080/01605682.2017.1415640

Pankratova N. D., Nedashkovskaya N. I. Method for processing fuzzy expert information in prediction problems. Part I, Journal of Automation and Information Sciences, 2007, Vol. 39, Issue 4, pp. 22–36. DOI: 10.1615/jautomatinfscien.v39.i4.30

Kuo T. Interval multiplicative pairwise comparison matrix: Consistency, indeterminacy and normality, Information Sciences, 2020, Vol. 517, pp. 244–253. DOI: 10.1016/j.ins.2019.12.066

Liu F., Zhang W. G., Fu J. H. A new method of obtaining the priority weights from an interval fuzzy preference relation, Information Sciences, 2012, Vol. 185, Issue 1, pp. 32– 42. DOI: 10.1016/j.ins.2011.09.019

Xu Y., Li K. W., Wang H. Consistency test and weight generation for additive interval fuzzy preference relations, Soft Computing, 2014, Vol. 18, Issue 8, pp. 1499–1513. DOI: 10.1007/s00500-013-1156-x

Wang Z-J., Yang X., Jin X.-T. And-like-uninorm-based transitivity and analytic hierarchy process with intervalvalued fuzzy preference relations, Information Sciences, 2020, Vol. 539, pp. 375–396. DOI: 10.1016/j.ins.2020.05.052

Wang Z.-J. A goal programming approach to deriving interval weights in analytic form from interval Fuzzy preference relations based on multiplicative consistency, Information Sciences, 2018, Vol. 462, pp. 160–181. DOI: 10.1016/j.ins.2018.06.006

López-Morales V. A reliable method for consistency improving of interval multiplicative preference relations expressed under uncertainty, International Journal of Information Technology & Decision Making, 2018, Vol. 17, Issue 5, pp. 1561–1585. DOI: 10.1142/S0219622018500359

Wang Z.-J., Lin J. Consistency and optimized priority weight analytical solutions of interval multiplicative preference relations, Information Sciences, 2019, Vol. 482, pp. 105–122. DOI: 10.1016/j.ins.2019.01.007.

Nedashkovskaya N. I. The М_Outflow Method for Finding the Most Inconsistent Elements of a Pairwise Comparison Matrix, System Analysis and Information Technologies (SAIT), 17th International Conference, Kyiv, 2015, proceeding. Kyiv, NTUU KPI, 2015, P. 90. http://sait.kpi.ua/media/filer_public/f8/7e/f87e3b7b-b254407f-8a58-2d810d23a2e5/sait2015ebook.pdf

Buckley J. J. Fuzzy hierarchical analysis, Fuzzy Sets and Systems, 1985, Vol. 17, Issue 3, pp. 233–247. DOI: 10.1016/0165-0114(85)90090-9

Van Laarhoven P.J.M., Pedrycz W. A fuzzy extension of Saaty’s priority theory, Fuzzy Sets and Systems, 1983, Vol. 11, Issues 1–3, pp. 229–241. DOI: 10.1016/S01650114(83)80082-7

Wang Y.-M., Elhag T. M. S., Hua Z. A modified fuzzy logarithmic least squares method for fuzzy analytic hierarchy process, Fuzzy Sets and Systems, 2006, Vol. 157, Issue 23, pp. 3055–3071. DOI: 10.1016/j.fss.2006.08.010

Zhang F., Ignatius J.,. Lim C. P et al. A new method for deriving priority weights by extracting consistent numericalvalued matrices from interval-valued fuzzy judgement matrix, Information Sciences, 2014, Vol. 279, pp. 280–300. DOI: 10.1016/j.ins.2014.03.120

METHOD FOR WEIGHTS CALCULATION BASED ON INTERVAL MULTIPLICATIVE PAIRWISE COMPARISON MATRIX IN DECISIONMAKING MODELS

Authors

DOI:

Keywords:

Abstract

Author Biography

N. I. Nedashkovskaya, Institute for Applied Systems Analysis at National Technical University of Ukraine “Igor Sikorsky Kyiv Polytechnic Institute”, Kyiv, Ukraine

References

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