DEA cross-efficiency evaluation and ranking method based on interval data

Data envelopment analysis (DEA) is an important method of efficiency evaluation. Cross-efficiency evaluation is one of the main aspects of research in the field of DEA that has been applied in various fields. In the traditional cross-efficiency evaluation model, the variable data of decision-making units is exact. Dynamic information is frequently unable to reflect the whole characteristic when determining the exact data. In this study, we select interval data to represent the dynamic information of some variables in the evaluation process. We then build a solution method based on interval efficiency and DEA cross-efficiency. This method retains the reflection of interval data on uncertain variable properties. Finally, the stochastic multi-criteria acceptability analysis 2 (SMAA2) is introduced to solve the whole sequence problem of interval efficiency. We present a case study from a set of 19 reservoir dams suffered from Wenchuan earthquake in Luojiang County, Sichuan Province to demonstrate the applicability of the proposed model.

[1]  W. Cooper,et al.  Idea and Ar-Idea: Models for Dealing with Imprecise Data in Dea , 1999 .

[2]  Risto Lahdelma,et al.  SMAA - Stochastic multiobjective acceptability analysis , 1998, Eur. J. Oper. Res..

[3]  Tommi Tervonen,et al.  JSMAA: open source software for SMAA computations , 2014, Int. J. Syst. Sci..

[4]  Qunxiong Zhu,et al.  Energy efficiency analysis method based on fuzzy DEA cross-model for ethylene production systems in chemical industry , 2015 .

[5]  Feng Yang,et al.  Ranking DMUs by using interval DEA cross efficiency matrix with acceptability analysis , 2012, Eur. J. Oper. Res..

[6]  Wang Zhihua,et al.  Fuzzy evaluation on seismic behavior of reservoir dams during the 2008 Wenchuan earthquake, China , 2015 .

[7]  Jian-Bo Yang,et al.  Interval efficiency assessment using data envelopment analysis , 2005, Fuzzy Sets Syst..

[8]  Joe Zhu,et al.  Imprecise DEA via Standard Linear DEA Models with a Revisit to a Korean Mobile Telecommunication Company , 2004, Oper. Res..

[9]  José L. Ruiz,et al.  Fuzzy cross-efficiency evaluation: a possibility approach , 2017, Fuzzy Optim. Decis. Mak..

[10]  Joe Zhu,et al.  Imprecise data envelopment analysis (IDEA): A review and improvement with an application , 2003, Eur. J. Oper. Res..

[11]  Gang Yu,et al.  An Illustrative Application of Idea (Imprecise Data Envelopment Analysis) to a Korean Mobile Telecommunication Company , 2001, Oper. Res..

[12]  Teresa León,et al.  Cross-Efficiency in Fuzzy Data Envelopment Analysis (FDEA): Some Proposals , 2014 .

[13]  K. Chin,et al.  Some alternative models for DEA cross-efficiency evaluation , 2010 .

[14]  Tomoe Entani,et al.  Dual models of interval DEA and its extension to interval data , 2002, Eur. J. Oper. Res..

[15]  Yao Chen Imprecise DEA - envelopment and Multiplier Model Approaches , 2007, Asia Pac. J. Oper. Res..

[16]  Dimitris K. Despotis,et al.  Data envelopment analysis with imprecise data , 2002, Eur. J. Oper. Res..

[17]  Per J. Agrell,et al.  A flexible cross-efficiency fuzzy data envelopment analysis model for sustainable sourcing , 2017 .

[18]  Peijun Guo,et al.  Fuzzy DEA: a perceptual evaluation method , 2001, Fuzzy Sets Syst..

[19]  Jie Wu,et al.  The DEA Game Cross-Efficiency Model and Its Nash Equilibrium , 2008, Oper. Res..

[20]  T. Sexton,et al.  Data Envelopment Analysis: Critique and Extensions , 1986 .

[21]  L. Seiford,et al.  Strict vs. weak ordinal relations for multipliers in data envelopment analysis , 1991 .

[22]  Zhixiang Zhou,et al.  Interval Efficiency of Two-stage Network DEA Model with Imprecise Data , 2013, INFOR Inf. Syst. Oper. Res..

[23]  Rodney H. Green,et al.  Efficiency and Cross-efficiency in DEA: Derivations, Meanings and Uses , 1994 .

[24]  Mariagrazia Dotoli,et al.  A cross-efficiency fuzzy Data Envelopment Analysis technique for performance evaluation of Decision Making Units under uncertainty , 2015, Comput. Ind. Eng..

[25]  Abraham Charnes,et al.  Measuring the efficiency of decision making units , 1978 .

[26]  Joe Zhu,et al.  Efficiency evaluation with strong ordinal input and output measures , 2003, Eur. J. Oper. Res..

[27]  Malin Song,et al.  A ranking method for DMUs with interval data based on dea cross-efficiency evaluation and TOPSIS , 2013 .

[28]  Yufeng Gao,et al.  Reply to the discussion by Utili on “Limit analysis of slopes with cracks: Comparisons of results” , 2015 .

[29]  Shu-Cherng Fang,et al.  Fuzzy data envelopment analysis (DEA): a possibility approach , 2003, Fuzzy Sets Syst..

[30]  Chiang Kao,et al.  Efficiencies of two-stage systems with fuzzy data , 2011, Fuzzy Sets Syst..

[31]  Risto Lahdelma,et al.  SMAA-2: Stochastic Multicriteria Acceptability Analysis for Group Decision Making , 2001, Oper. Res..