References
- Allen, R., Athanassopoulos, A., Dyson, R. G., & Thanassoulis, E. (1997). Weights restrictions and value judgements in data envelopment analysis: Evolution, development and future directions. Annals of Operations Research, 73, 13–34.
- Angulo-Meza, L., & Estellita Lins, M. P. (2002). Review of methods for increasing discrimination in data envelopment analysis. Annals of Operations Research, 116(1–4), 225–242.
- Banker, R. D., Charnes, A., & Cooper, W. W. (1984). Some models for estimating technical and scale inefficiencies in data envelopment analysis. Management Science, 30(9), 1078–1092.
- Beasley, J. E. (2003). Allocating fixed costs and resources via data envelopment analysis. European Journal of Operational Research, 147(1), 198–216.
- Bi, G., Feng, C., Ding, J., Liang, L., & Chu, F. (2014). The linear formulation of the ZSG-DEA models with different production technologies. Journal of the Operational Research Society, 65(8), 1202–1211.
- Boyd, S. S. & Vandenberghe, L. (2004). Convex optimization (Vol. 25). Cambridge: Cambridge University Press.
- Charnes, A., Cooper, W., Huang, Z., & Sun, D. (1990). Polyhedral Cone-Ratio DEA Models with an illustrative application to large commercial banks. Journal of Econometrics, 46(1–2), 73–91.
- Charnes, A., Cooper, W., & Rhodes, E. (1978). Measuring the efficiency of decision making units. European Journal of Operational Research, 2(6), 429–444.
- Cook, W. D., & Kress, M. (1999). Characterizing an equitable allocation of shared costs: A DEA approach. European Journal of Operational Research, 119(3), 652–661.
- Cook, W. D., & Zhu, J. (2005). Allocation of shared costs among decision making units: A DEA approach. Computers and Operations Research, 32(8), 2171–2178.
- Cooper, W. W., Seiford, L. M., & Tone, K. (2007). Data envelopment analysis: A comprehensive text with models, applications, references and DEA-solver software (2nd ed.). New York: Springer.
- Du, J., Cook, W. D., Liang, L., & Zhu, J. (2014). Fixed cost and resource allocation based on DEA cross-efficiency. European Journal of Operational Research, 235(1), 206–214.
- Dyson, R. G., & Thanassoulis, E. (1988). Reducing weight flexibility in data envelopment analysis. Journal of the Operational Research Society, 39(6), 563–576.
- Farrell, M. J. (1957). The measurement of productive efficiency Journal of the Royal Statistical Society. Series A (General), 120(3), 253–290.
- Fonseca, A. B. D. M., de Mello, J. C. C. B. S., Gomes, E. G., & Meza, L. A. (2010). Uniformization of frontiers in non-radial ZSG-DEA models: An application to airport revenues. Pesquisa Operacional, 30(1), 175–193.
- Guedes, C. E. C., Milioni, Z. A., de Avellar, G. J. V., & Silva, C. R. (2012). Adjusted spherical frontier model: Allocating input via parametric DEA. Journal of the Operational Research Society, 63(3), 406–417.
- Guedes, C. E. C.. (2007). Modelo de Fronteira Esférica Ajustado: Alocando Input via DEA Paramétrico ( PhD thesis). Instituto Tecnológico de Aeronáutica.
- Guedes de Avellar, J. V., Milioni, A. Z., & Rabello, T. N. (2007). Spherical frontier DEA model based on a constant sum of inputs. Journal of the Operational Research Society, 58(9), 1246–1251.
- Khodabakhshi, M., & Aryavash, K. (2014). The fair allocation of common fixed cost or revenue using DEA concept. Annals of Operations Research, 214(1), 187–194.
- Li, Y., Yang, F., Liang, L., & Hua, Z. (2009). Allocating the fixed cost as a complement of other cost inputs: A DEA approach. European Journal of Operational Research, 197(1), 389–401.
- Li, Y., Yang, M., Chen, Y., Dai, Q., & Liang, L. (2013). Allocating a fixed cost based on data envelopment analysis and satisfaction degree. Omega, 41(1), 55–60.
- Lins, M. P. E., Gomes, E. G., Soares de Mello, J. C. C. B., & Soares de Mello, A. J. R. (2003). Olympic ranking based on a zero sum gains DEA model. European Journal of Operational Research, 148(2), 312–322.
- Milioni, A. Z., & Alves, L. B. (2013). Ten years of research on parametric data envelopment analysis. Pesquisa Operacional, 33(1), 89–104.
- Milioni, A. Z., De Avellar, J. V. G., Gomes, E. G., & Soares De Mello, J. C. C. B. (2011a). An ellipsoidal frontier model: Allocating input via parametric DEA. European Journal of Operational Research, 209(2), 113–121.
- Milioni, Z. A., de Avellar, G. J. V., Rabello, N. T., & de Freitas, M. G. (2011b). Hyperbolic frontier model: A parametric DEA approach for the distribution of a total fixed output. Journal of the Operational Research Society, 62(6), 1029–1037.
- Nacif, F. B., Mello, J. C. C. B. S., & Meza, L. A. (2009). Choosing weights in optimal solutions for DEA-BCC models by means of a N-dimensional smooth frontier. Pesquisa Operacional, 29(3), 623–642.
- PedrajaChaparro, F., SalinasJimenez, J., & Smith, P. (1997). On the role of weight restrictions in data envelopment analysis. Journal of Productivity Analysis, 8(2), 215–230.
- Si, X., Liang, L., Jia, G., Yang, L., Wu, H., & Li, Y. (2013). Proportional sharing and DEA in allocating the fixed cost. Applied Mathematics and Computation, 219(12), 6580–6590.
- Silva, R. C., & Milioni, A. Z. (2012). The adjusted spherical frontier model with weight restrictions. European Journal of Operational Research, 220(3), 729–735.
- Wong, Y.-H. B., & Beasley, J. E. (1990). Restricting weight flexibility in data envelopment analysis. Journal of the Operational Research Society, 41(9), 829–835.
- Yang, F., Wu, D. D., Liang, L., & O’Neill, L. (2011). Competition strategy and efficiency evaluation for decision making units with fixed-sum outputs. European Journal of Operational Research, 212(3), 560–569.
- Yang, M., Li, Y., Chen, Y., & Liang, L. (2014). An equilibrium efficiency frontier data envelopment analysis approach for evaluating decision-making units with fixed-sum outputs. European Journal of Operational Research, 239(2), 479–489.
- Yang, M., Li, Y. J., & Liang, L. (2015). A generalized equilibrium efficient frontier data envelopment analysis approach for evaluating DMUs with fixed-sum outputs. European Journal of Operational Research, 246(1), 209–217.