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Imprecise DEA Efficiency Assessments : Characterizations and Methods  

Park, Kyung-Sam (Korea University, Business School)
Publication Information
Management Science and Financial Engineering / v.14, no.2, 2008 , pp. 67-87 More about this Journal
Abstract
Data envelopment analysis (DEA) has proven to be a useful tool for assessing efficiency or productivity of organizations which is of vital practical importance in managerial decision making. While DEA assumes exact input and output data, the development of imprecise DEA (IDEA) broadens the scope of applications to efficiency evaluations involving imprecise information which implies various forms of ordinal and bounded data possibly or often occurring in practice. The primary purpose of this article is to characterize the variable efficiency in IDEA. Since DEA describes a pair of primal and dual models, also called envelopment and multiplier models, we can basically consider two IDEA models: One incorporates imprecise data into envelopment model and the other includes the same imprecise data in multiplier model. The issues of rising importance are thus the relationships between the two models and how to solve them. The groundwork we will make includes a duality study which makes it possible to characterize the efficiency solutions from the two models. This also relates to why we take into account the variable efficiency and its bounds in IDEA that some of the published IDEA studies have made. We also present computational aspects of the efficiency bounds and how to interpret the efficiency solutions.
Keywords
DEA; Duality; Efficiency Evaluation; Imprecise Data; Linear Programming;
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  • Reference
1 Chen, Y., L. M. Seiford, and J. Zhu, Imprecise data envelopment analysis, Unpublished paper, Worcester Polytechnic Institute, Worcester, MA, 2000
2 Cooper, W. W., K. S. Park, and G. Yu, An illustrative application of IDEA (imprecise data envelopment analysis) to a Korean mobile telecommunication company, Operations Research 49 (2001), 807‐820
3 Cook, W. D., M. Kress, and L. M. Seiford, On the use of ordinal data in data envelopment analysis, Journal of the Operational Research Society 44 (1993), 133-140   DOI
4 Kao, C. and S. T. Liu, Data envelopment analysis with missing data: An application to university libraries in Taiwan, Journal of the Operational Research Society 51 (2000), 897‐905
5 Kao, C., Interval efficiency measures in data envelopment analysis with imprecise data, European Journal of Operational Research 174 (2006), 1087‐1099
6 Kim, S. H., C. K. Park, and K. S. Park, An application of data envelopment analysis in telephone offices evaluation with partial data, Computers and Operations Research 26 (1999), 59‐72
7 Olesen, O. B., N. C. Petersen, Probabilistic bounds on the virtual multipliers in data envelopment analysis: Polyhedral cone constraints, Journal of Productivity Analysis 12 (1999), 103‐134
8 Cooper, W. W., K. S. Park, and G. Yu, IDEA and AR‐IDEA: Models for dealing with imprecise data in DEA, Management Science 45 (1999), 597‐607
9 Cooper, W. W., K. S. Park, and G. Yu, IDEA (imprecise data envelopment analysis) with CMDs (column maximum decision making units), Journal of the Operational Research Society 52 (2001), 176‐181
10 Zhu, J., Imprecise data envelopment analysis (IDEA): A review and improvement with an application, European Journal of Operational Research 144 (2003), 513‐529
11 Park, K. S., Efficiency bounds and efficiency classifications in DEA with imprecise data, Journal of the Operational Research Society 58 (2007), 533‐540
12 Thompson, R. G., L. N. Langemeier, C. T. Lee, E. Lee, and R. M. Thrall, The role of multiplier bounds in efficiency analysis with applications to Kansas farming, Journal of Econometrics 46 (1990), 93‐108
13 Park, K. S., Simplification of the transformations and redundancy of assurance regions in IDEA (imprecise DEA), Journal of the Operational Research Society 55 (2004), 1363‐1366
14 Cook, W. D., M. Kress, and L. M. Seiford, Data envelopment analysis in the presence of both quantitative and qualitative factors, Journal of the Operational Research Society 47 (1996), 945‐953
15 Cook, W. D. and J. Zhu, Rank order data in DEA: A general framework, European Journal of Operational Research 174 (2005), 1021‐1038
16 Charnes, A., W. W. Cooper, and E. Rhodes, Measuring the efficiency of decision making units, European Journal of Operational Research 2 (1978), 429‐444
17 Olesen, O. B. and N. C. Petersen, Chance constrained efficiency evaluation, Management Science 41 (1995), 442‐457
18 Simar, L., P. W. Wilson, Statistical inference in nonparametric frontier models: The state of the art, Journal of Productivity Analysis 13 (2000), 49‐78
19 Soyster, A. L., Inexact linear programming with generalized resource sets, European Journal of Operational Research 3 (1979), 316‐321
20 Despotis, D. K. and Y. G. Smirlis, Data envelopment analysis with imprecise data, European Journal of Operational Research 140 (2002), 24‐36
21 Arnold, V., I. Bardhan, W. W. Cooper, and A. Gallegos, Primal and dual optimality in computer codes using two‐stage solution procedures in DEA, In: Aranson, J., Zionts, S. (Eds.), Operations Research: Methods, Models and Applications Quorum Books, Westport, CT, (1998), 57‐96
22 Banker, R. D., Maximum likelihood, consistency and data envelopment analysis: A statistical foundation, Management Science 39 (1993), 1265‐1273
23 Zhu, J., Imprecise DEA via standard linear DEA models with a revisit to a Korean mobile telecommunication company, Operations Research 52 (2004), 323‐ 329   DOI   ScienceOn
24 Charnes, A., W. W. Cooper, Z. M. Huang, and D. B. Sun, Polyhedral cone‐ratio DEA models with an illustrative application to large commercial banks, Journal of Econometrics 46 (1990), 73‐91
25 Kao, C. and S. T. Liu, Fuzzy efficiency measures in data envelopment analysis, Fuzzy Sets and Systems 113 (2000), 427‐437
26 Soyster, A. L., Convex programming with set‐inclusive constraints and applications to inexact linear programming, Operations Research 21 (1973), 1154‐1157   DOI   ScienceOn
27 Thompson, R. G., P. S. Dharmapala, and R. M. Thrall, Linked‐cone DEA profit ratios and technical efficiency with application to Illinois coal mines, International Journal of Production Economics 39 (1995), 99‐115