Authors: Alexander Y. Vaninsky

Abstract:

This paper presents a simplified version of Data Envelopment Analysis (DEA) - a conventional approach to evaluating the performance and ranking of competitive objects characterized by two groups of factors acting in opposite directions: inputs and outputs. DEA with a Perfect Object (DEA PO) augments the group of actual objects with a virtual Perfect Object - the one having greatest outputs and smallest inputs. It allows for obtaining an explicit analytical solution and making a step to an absolute efficiency. This paper develops this approach further and introduces a DEA model with Partially Perfect Objects. DEA PPO consecutively eliminates the smallest relative inputs or greatest relative outputs, and applies DEA PO to the reduced collections of indicators. The partial efficiency scores are combined to get the weighted efficiency score. The computational scheme remains simple, like that of DEA PO, but the advantage of the DEA PPO is taking into account all of the inputs and outputs for each actual object. Firm evaluation is considered as an example.

Keywords: Data Envelopment Analysis, Perfect object, Partially perfect object, Partial efficiency, Explicit solution, Simplified algorithm.

Digital Object Identifier (DOI): doi.org/10.5281/zenodo.1086663

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References:

[1] Banker, R., A. Charnes, and W. Cooper. Some models for estimating technical and scale efficiency in Data Envelopment Analysis. Management Science 30(9): 1984; 1078–1092.
[2] Charnes, A., W. Cooper, and E. Rhodes. Measuring the efficiency of decision-making units. European Journal of Operational Research 1978; 2: 429–444.
[3] Cooper W., L. Seiford, and J. Zhu (eds.).Handbook on data envelopment analysis. International Series in Operations Research & Management Science, vol 164, 2nd ed. New York: Springer, 2011.
[4] Farrell M.J. The Measurement of Production Efficiency. Journal of the Royal Statistical Society, Series A 1957; 120(3): 253 - 282.
[5] Vaninsky, A.DEA with a perfect object: Analytical Solutions. Communications in Mathematics and Applications 2011; 2(1):1–13.
[6] Vaninsky, A. Environmental performance of the United States Energy Sector: A DEA model with non-discretionary factors and perfect object.Proceedings of the World Academy of Science, Engineering and Technology (WASET) 2009; 54:139–144. Available at www.waset.org/journals/waset/v30/v30-26.pdf
[7] Vaninsky, A.Explicit formulas for efficiency scores and weight coefficients in DEA problems with a perfect object. International Journal of Mathematical Modeling, Simulation and Applications 2011; 4(3): 217
[8] Vaninsky, A. Simplified Data Envelopment Analysis: What Country Won the Olympics, and How about our CO2 Emissions? Numeracy 2013; 6(2) Forthcoming. Available at cholarcommons.usf.edu/numeracy.