Robust minimum cost consensus models with aggregation operators under individual opinion uncertainty

Individual opinion is one of the vital factors influencing the consensus in group decision-making, and is often uncertain. The previous studies mostly used probability distribution, interval distribution or uncertainty distribution function to describe the uncertainty of individual opinions. However, this requires an accurate understanding of the individual opinions distribution, which is often difficult to satisfy in real life. In order to overcome this shortcoming, this paper uses a robust optimization method to construct three uncertain sets to better characterize the uncertainty of individual initial opinions. In addition, we used three different aggregation operators to obtain collective opinions instead of using fixed values. Furthermore, we applied the numerical simulations on flood disaster assessment in south China so as to evaluate the robustness of the solutions obtained by the robust consensus models that we proposed. The results showed that the proposed models are more robust than the previous models. Finally, the sensitivity analysis of uncertain parameters was discussed and compared, and the characteristics of the proposed models were revealed.

[1]  Yejun Xu,et al.  Consensus of large-scale group decision making in social network: the minimum cost model based on robust optimization , 2020, Information Sciences.

[2]  Shao-Jian Qu,et al.  The mixed integer robust maximum expert consensus models for large-scale GDM under uncertainty circumstances , 2021, Appl. Soft Comput..

[3]  Wlodzimierz Ogryczak,et al.  On solving linear programs with the ordered weighted averaging objective , 2003, Eur. J. Oper. Res..

[4]  Zaiwu Gong,et al.  Two-stage stochastic minimum cost consensus models with asymmetric adjustment costs , 2021, Inf. Fusion.

[5]  E. Herrera‐Viedma,et al.  The consensus models with interval preference opinions and their economic interpretation , 2015 .

[6]  Arkadi Nemirovski,et al.  Robust solutions of uncertain linear programs , 1999, Oper. Res. Lett..

[7]  Francisco Herrera,et al.  Some induced ordered weighted averaging operators and their use for solving group decision-making problems based on fuzzy preference relations , 2007, Eur. J. Oper. Res..

[8]  David Ben-Arieh,et al.  Multi-criteria group consensus under linear cost opinion elasticity , 2007, Decis. Support Syst..

[9]  El Mostafa Qannari,et al.  Degrees of freedom estimation in Principal Component Analysis and Consensus Principal Component Analysis , 2012 .

[10]  Francisco Herrera,et al.  Consensus reaching in social network DeGroot Model: The roles of the Self-confidence and node degree , 2019, Inf. Sci..

[11]  Yin-Feng Xu,et al.  Minimum-Cost Consensus Models Under Aggregation Operators , 2011, IEEE Transactions on Systems, Man, and Cybernetics - Part A: Systems and Humans.

[12]  Ning Zhang,et al.  The optimization ordering model for intuitionistic fuzzy preference relations with utility functions , 2018, Knowl. Based Syst..

[13]  Luis Martínez-López,et al.  Analyzing the performance of classical consensus models in large scale group decision making: A comparative study , 2017, Appl. Soft Comput..

[14]  Yin-Feng Xu,et al.  On reciprocity indexes in the aggregation of fuzzy preference relations using the OWA operator , 2008, Fuzzy Sets Syst..

[15]  Arkadi Nemirovski,et al.  Robust solutions of Linear Programming problems contaminated with uncertain data , 2000, Math. Program..

[16]  Hui Li,et al.  The induced continuous ordered weighted geometric operators and their application in group decision making , 2009, Comput. Ind. Eng..

[17]  Luis Martínez,et al.  Comprehensive minimum cost models for large scale group decision making with consistent fuzzy preference relations , 2021, Knowl. Based Syst..

[18]  Yucheng Dong,et al.  Consensus mechanism with maximum-return modifications and minimum-cost feedback: A perspective of game theory , 2020, Eur. J. Oper. Res..

[19]  Luis Martínez-López,et al.  A Cost Consensus Metric for Consensus Reaching Processes based on a comprehensive minimum cost model , 2020, Eur. J. Oper. Res..

[20]  Ning Zhang,et al.  Minimum cost consensus models based on random opinions , 2017, Expert Syst. Appl..

[21]  Guy De Tré,et al.  A large scale consensus reaching process managing group hesitation , 2018, Knowl. Based Syst..

[22]  Yejun Xu,et al.  Social network group decision making: Managing self-confidence-based consensus model with the dynamic importance degree of experts and trust-based feedback mechanism , 2019, Inf. Sci..

[23]  Ning Zhang,et al.  Consensus modeling with cost chance constraint under uncertainty opinions , 2017, Appl. Soft Comput..

[24]  David Ben-Arieh,et al.  Minimum Cost Consensus With Quadratic Cost Functions , 2009, IEEE Transactions on Systems, Man, and Cybernetics - Part A: Systems and Humans.

[25]  Cuiping Wei,et al.  Two-stage consensus model based on opinion dynamics and evolution of social power in large-scale group decision making , 2021, Appl. Soft Comput..

[26]  Yucheng Dong,et al.  The interactive consensus reaching process with the minimum and uncertain cost in group decision making , 2017, Appl. Soft Comput..

[27]  Francisco Herrera,et al.  Managing consensus based on leadership in opinion dynamics , 2017, Inf. Sci..

[28]  Shaojian Qu,et al.  Robust consensus models based on minimum cost with an application to marketing plan , 2019, J. Intell. Fuzzy Syst..

[29]  Enrique Herrera-Viedma,et al.  Group Decision Making with Heterogeneous Preference Structures: An Automatic Mechanism to Support Consensus Reaching , 2019, Group Decision and Negotiation.

[30]  Ronald R. Yager,et al.  On ordered weighted averaging aggregation operators in multicriteria decision-making , 1988 .

[31]  Yuan Gao,et al.  The optimization-based aggregation and consensus with minimum-cost in group decision making under incomplete linguistic distribution context , 2018, Knowl. Based Syst..

[32]  Ronald R. Yager,et al.  On ordered weighted averaging aggregation operators in multicriteria decisionmaking , 1988, IEEE Trans. Syst. Man Cybern..

[33]  Qi Sun,et al.  An attitudinal consensus degree to control the feedback mechanism in group decision making with different adjustment cost , 2019, Knowl. Based Syst..

[34]  Guo Wei,et al.  Consistency and consensus modeling of linear uncertain preference relations , 2020, Eur. J. Oper. Res..

[35]  Arkadi Nemirovski,et al.  Robust Convex Optimization , 1998, Math. Oper. Res..