Abstract
The aim of this paper is to develop a ranking method based on shape similarity applying to group decision-making problems. The proposed expressive method uses a symbolic representation to depict each membership function taking into account its shape characteristics and the relative length approximates on its X-axis segments. Considering the context of discrete fuzzy numbers, this paper employs the symbolic representation expressive method to represent the shape of membership function. The strategy of ranking is based on the similarity between unsorted evaluation and the “negative ideal” evaluation, and these evaluations have been depicted in symbolic representation basically. A signed similarity measure was carried at analyzing differences of the “negative ideal” one and unsorted one. The feasibility and applicability of the ranking method are illustrated with an example to give more details in this problem. Additionally, some comparative analyses are performed with other ranking methods combined with different fuzzy linguistic models (probabilistic linguistic term sets and hesitant fuzzy linguistic term sets) to validate the flexibility and robustness of the proposed methodology.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
Explore related subjects
Discover the latest articles, news and stories from top researchers in related subjects.References
Baccour L, Alimi AM, John RI (2013) Similarity measures for intuitionistic fuzzy sets: State of the art. J Intell Fuzzy Syst Appl Eng Technol 24(1):37–491
Bai Z (2013) Distance similarity measures for interval-valued hesitant fuzzy sets and their application in multicriteria decision making. Decis Syst 22(3):190–201
Bai C, Zhang R, Qian L, Wu Y (2017) Comparisons of probabilistic linguistic term sets for multi-criteria decision making. Knowl Based Syst 119:284–291
Cabrerizo FJ, Herrera-Viedma E, Pedrycz W (2013) A method based on PSO and granular computing of linguistic information to solve group decision making problems defined in heterogeneous contexts. Eur J Oper Res 230(3):624–633
Cabrerizo FJ, Ureña MR, Pedrycz W, Herrera-Viedma E (2014) Building consensus in group decision making with an allocation of information granularity. Fuzzy Sets Syst 255:115–127
Cabrerizo FJ, Al-Hmouz R, Morfeq A, Balamash AS, Martínez MA, Herrera-Viedma E (2017) Soft consensus measures in group decision making using unbalanced fuzzy linguistic information. Soft Comput 21(11):3037–3050
Cabrerizo FJ, Morente-Molinera JA, Pedrycz W, Taghavi A, Herrera-Viedma E (2018) Granulating linguistic information in decision making under consensus and consistency. Expert Syst Appl 99:83–92
Capitaine HL (2012) A relevance-based learning model of fuzzy similarity measures. IEEE Trans Fuzzy Syst 20(1):57–68
Casasnovas J, Riera JV (2011) Extension of discrete t-norms and t-conorms to discrete fuzzy numbers. FuzzySetsSyst 167(1):65–81
Chen LH, Lu HW (2001) An approximate approach for ranking fuzzy numbers based on left and right dominance. Comput Math Appl 41(12):1589–1602
Cheng SH, Chen SM, Huang ZC (2016) Autocratic decision making using group recommendations based on ranking interval type-2 fuzzy sets. Inf Sci 361–362:135–161
del Moral MJ, Chiclana F, Tapia JM, Herrera-Viedma E (2018) A comparative study on consensus measures in group decision making. Int J Intell Syst 33(8):1624–1638
Dice LR (1945a) Measures of the amount of ecologic association between species. Ecology 26(3):297–302
Dice LR (1945b) Measures of the amount of ecologic association between species. Ecology 26:297–302
Dong Y, Chen X, Herrera F (2014) Minimizing adjusted simple terms in the consensus reaching process with hesitant linguistic assessments in group decision making. Inf Sci 297:95–117
Eshragh F, Mamdani E (1979) A general approach to linguistic approximation. Int J Man Mach Stud 11:501–519
Gou XJ, Xu ZS, Liao HC (2017a) Hesitant fuzzy linguistic entropy and cross-entropy measures and alternative queuing method for multiple criteria decision making. Inf Sci 388–389:225–246
Gou XJ, Xu ZS, Liao HC (2017b) Multiple criteria decision making based on Bonferroni means with hesitant fuzzy linguistic information. Soft Comput 21:6515–6529
Gusfield D (1997) Algorithms on strings, trees, and sequences: computer science and computational biology. Cambridge University Press, New York
Herrera F, Herrera-Viedma E (2000) Choice functions and mechanisms for linguistic preference relations. Eur J Oper Res 120(1):144–161
Herrera F, Martinez L (2000) A 2-tuple fuzzy linguistic representation model for computing with words. IEEE Trans Fuzzy Syst 8(6):746–752
Herrera F, Herrera-Viedma E, Verdegay JL (1994) Direct approach processes in group decision making using linguistic OWA operators. Fuzzy Sets Syst 79:175–190
Herrera F, Herrera-Viedma E, Martínez L (2008) A fuzzy linguistic methodology to deal with unbalanced linguistic term sets. IEEE Trans Fuzzy Syst 16(2):354–370
Herrera-Viedma E, Riera JV, Massanet S, Torrens J (2014) Some remarks on the fuzzy linguistic model based on discrete fuzzy numbers. In: Proceedings of the 7th IEEE international conference on intelligent systems, vol 322, pp 319–330
Jaccard P (1908) Nouvelles Recherches Sur la Distribution Florale. Bull De La Soc Vaudoise Des Sci Nat 44(163):223–270
Johanyák ZC, Kovács S (2009) Distance based similarity measures of fuzzy sets. Proc SAMI 9:265–276
Lee-Kwang H, Song YS, Lee KM (1994) Similarity measure between fuzzy sets and between elements. Fuzzy Sets Syst 62(3):291–293
Liao H, Xu Z (2015) Approaches to manage hesitant fuzzy linguistic information based on the cosine distance and similarity measures for HFLTSs and their application in qualitative decision making. Expert Syst Appl 42(12):5328–5336
Liao HC, Xu ZS, Zeng XJ (2014) Distance and similarity measures for hesitant fuzzy linguistic term sets and their application in multi-criteria decision making. Inf Sci 271:125–142
Liao H, Xu Z, Zeng XJ, Xu DL (2015a) An enhanced consensus reaching process in group decision making with intuitionistic fuzzy preference relations. Inf Sci 329(C):274–286
Liao HC, Xu ZS, Zeng XJ, Merigó JM (2015b) Qualitative decision making with correlation coefficients of hesitant fuzzy linguistic term sets. Knowl Based Syst 76:127–138
Liao H, Xu Z, Herrera-Viedma E, Herrera F (2018) Hesitant fuzzy linguistic term set and its application in decision making: a state-of-the-art survey. Int J Fuzzy Syst 20(7):2084–2110
Liu W, Dong Y, Chiclana F, Cabrerizo FJ, Herrera-Viedma E (2017) Group decision-making based on heterogeneous preference relations with self-confidence. Fuzzy Optim Decis Mak 16(4):429–447
Martínez L, Herrera F (2012) An overview on the 2-tuple linguistic model for computing with words in decision making: extensions, applications and challenges. Inf Sci 207:1–18
Mas M, Monserrat M, Torrens J (2014) Kernel aggregation functions on finite scales. Constructions from their marginal. Fuzzy Sets Syst 241(8):27–40
Massanet S, Riera JV, Torrens J, Herrera-Viedma E (2014) A new linguistic computational model based on discrete fuzzy numbers for computing with words. Inf Sci 258:277–290
Massanet S, Vicente Riera J, Torrens J et al (2016) A model based on subjective linguistic preference relations for group decision making problems. Inf Sci Int J 355(5):249–264
Matarazzo B, Munda G (1996) New approaches for the comparison of L-R fuzzy numbers: a theoretical and operational analysis. Fuzzy Sets Syst 118(3):407–418
Meng FY, Chen XH (2015) A hesitant fuzzy linguistic multi-granularity decision making model based on distance measures. J Intell Fuzzy Syst 28(4):1519–1531
Morente-Molinera JA, Perez IJ, Ureña MR et al (2015) On multi-granular fuzzy linguistic modeling in group decision making problems: a systematic review and future trends. Knowl Based Syst 74(1):49–60
Morente-Molinera JA, Mezei J, Carlsson C, Herrera-Viedma E (2017) Improving supervised learning classification methods using multi-granular linguistic modelling and fuzzy entropy. IEEE Trans Fuzzy Syst 25(5):1078–1089
Pang Q, Wang H, Xu Z (2016) Probabilistic linguistic term sets in multi-attribute group decision making. Inf Sci 369:128–143
Perez IJ, Cabrerizo FJ, Herrera-Viedma E (2010) A mobile decision support system for dynamic group decision-making problems. IEEE Trans Syst Man Cybern A Syst Hum 40(6):1244–1256
Perez IJ, Cabrerizo FJ, Herrera-Viedma E (2011) Group decision making problems in a linguistic and dynamic context. Expert Syst Appl 38(3):1675–1688
Perez IJ, Cabrerizo FJ, Alonso S, Dong YC, Chiclana F, Herrera-Viedma E (2018) On dynamic consensus processes in group decision making problems. Inf Sci 459:20–35
Riera JV, Torrens J (2012) Aggregation of subjective evaluations based on discrete fuzzy numbers. Fuzzy Sets Syst 191:21–40
Riera JV, Torrens J (2014) Aggregation functions on the set of discrete fuzzy numbers defined from a pair of discrete aggregations. Fuzzy Sets Syst 241(241):76–93
Riera JV, Torrens J (2015) Using discrete fuzzy numbers in the aggregation of incomplete qualitative information. FuzzySetsSyst 264:121–137
Riera JV, Massanet S, Herrera-Viedma E, Torrens J (2015) Some interesting properties of the fuzzy linguistic model based on discrete fuzzy numbers to manage hesitant fuzzy linguistic information. Appl Soft Comput 36:383–391
Rodriguez R, Martinez L, Herrera F (2012) Hesitant fuzzy linguistic term sets for decision making. IEEE Trans Fuzzy Syst 20(1):109–119
Rodríguez RM, Martínez L, Herrera F (2013) A group decision making model dealing with comparative linguistic expressions based on hesitant fuzzy linguistic term sets. Inf Sci 241:28–42
Tapia-Rosero A, Bronselaer A, Tré GD (2014) A method based on shape-similarity for detecting similar opinions in group decision-making. Inf Sci 258(258):291–311
Turksen IB (2002) Type 2 representation and reasoning for CWW. Fuzzy Sets Syst 127:17–36
Tversky D (1977) Features of similarities. Psychol Rev 84:327–352
Tversky A (1988) Features of similarity. Read Cogn Sci 84(4):290–302
Voxman W (2001) Canonical representations of discrete fuzzy numbers. Fuzzy Sets Syst 118(3):457–466
Wang JQ, Wu JT, Wang J et al (2016) Multi-criteria decision-making methods based on the Hausdorff distance of hesitant fuzzy linguistic numbers. Soft Comput 20(4):1621–1633
Wei C, Zhao N, Tang X (2014) Operators and Comparisons of hesitant fuzzy linguistic term sets. IEEE Trans Fuzzy Syst 22:575–585
Xu Z, Xia M (2011) Distance and similarity measures for hesitant fuzzy sets. Inf Sci 181(11):2128–2138
Xuecheng L (1992) Entropy, distance measure and similarity measure of fuzzy sets and their relations. Fuzzy Sets Syst 52(3):305–318
Yager R (1981) A new methodology for ordinal multiobjective decisions based on fuzzy sets. Decis Sci 12:589–600
Zadeh LA (1971) Similarity relations and fuzzy orderings. Inf Sci 3(2):177–200
Zhang H, Yu L (2013) New distance measures between intuitionistic fuzzy sets and interval-valued fuzzy sets. Inf Sci 245(10):181–196
Zhang H, Dong Y, Herrera-Viedma E (2017) Consensus building for the heterogeneous large-scale GDM with the individual concerns and satisfactions. IEEE Trans Fuzzy Syst 26(2):884–898
Zwick R, Carlstein E, Budescu DV (1987) Measures of similarity among fuzzy concepts: a comparative analysis. Int J Approx Reason 1(2):221–242
Funding
This study was supported by the National Natural Science Foundation of China (71701037, 71701038, 71601041).
Author information
Authors and Affiliations
Corresponding author
Ethics declarations
Conflict of interest
The authors declare that they have no conflict of interest.
Additional information
Communicated by V. Loia.
Publisher’s Note
Springer Nature remains neutral with regard to jurisdictional claims in published maps and institutional affiliations.
Rights and permissions
About this article
Cite this article
Zhao, M., Liu, MY., Su, J. et al. A shape similarity-based ranking method of hesitant fuzzy linguistic preference relations using discrete fuzzy number for group decision making. Soft Comput 23, 13569–13589 (2019). https://doi.org/10.1007/s00500-019-03895-7
Published:
Issue Date:
DOI: https://doi.org/10.1007/s00500-019-03895-7