References
- Campos, L., & Verdegay, J. L. (1989). Linear programming problems and ranking of fuzzy numbers. Fuzzy Sets and Systems, 32, 1–11.
- Chakraborty, C., & Chakraborty, D. (2004). A decision scheme based on OWA operator for an evaluation program: An approximate reasoning approach. Applied Soft Computing, 5, 4.
- Chen, L., & Hai-Wen, L. (2001). An approximate approach for ranking fuzzy numbers based on left and right dominance. Computers and Mathematics with Applications, 41, 1589–1602.
- Chena, V.Y., Lienb, H.-P., Liuc, C.-H., Lioud, J.J., Tzenge, G.-H., & Yangg, L.-S. (2011). Fuzzy MCDM approach for selecting the best environment-watershed plan. Applied Soft Computing, 11(1), 265–275.
- Choobineh, F., & Li, H. (1993). An index for ordering fuzzy numbers. Fuzzy Sets and Systems, 54, 287–294.
- Costa, C.A., & Oliveira, M.D. (2012). A multicriteria decision analysis model for faculty evaluation. Omega, 40(4), 424–436.
- Felix, R. (2008). MCDM: Management of aggregation complexity through fuzzy interactions between goals or criteria. In L. Magdalena, M. Ojeda-Aciego, & J.L. Verdegay (eds). Proceedings of IMPU'08 (pp. 1431–1437).
- Felix, R. (2013). Optimization of partly conflicting goals in complex resource planning. In EUSFLAT -2013 (pp. 669–674). ATLANTIS Press. doi:10.2991/eusflat.2013.101
- Fuller, R., & Majlender, P. (2003). On obtaining minimal variability OWA operator weights. Fuzzy Sets and Systems, 136, 203–215.
- Grabisch, M., & Labreuche, C. (2001). How to improve acts: An alternative representation of the importance of criteria in MCDM. International Journal of Uncertainty Fuzziness and Knowledge Based System, 9, 145–157.
- Huede, F., Grabisch, M., Labreuche, C., & Saveant, P. (2006). MCS- A new algorithm for multi-criteria optimization in constraint programming. Annals of Operations Research, 147, 143–174.
- Hung, Y.-H., Choua, S.-C.T., & Tzengc, G.-H. (2011). Knowledge management adoption and assessment for SMEs by a novel MCDM approach. Decision Support Systems, 51(2), 270–291.
- Kolesfirovfi, A., & Komornikovfi, M. (1999). Triangular norm-based iterative compensatory operators. Fuzzy Sets and Systems, 104, 109–129.
- Kosko, B. (1986). Fuzzy knowledge combination. International Journal of Intelligent Systems, 1, 293–320.
- Kuoa, M.-S., & Lian, G.-S. (2011). A novel hybrid decision-making model for selecting locations in a fuzzy environment. Mathematical and Computer Modelling, 54, 88–104.
- Labreuche, C., & Grabisch, M. (2006). Generalized Choquet-like aggregation functions for handling bipolar scales. European Journal of Operational Research, 172, 931–955.
- Labreuchea, C., & Grabisch, M. (2003). The Choquet integral for the aggregation of interval scales in multicriteria decision making. Fuzzy Sets and Systems , 137, 11–26.
- Luhandjula, M.K. (1982). Compensatory operators in fuzzy linear programming with multiple objectives. Fuzzy Sets and Systems, 8(3), 245–252.
- Merad, M., Dechy, N., Serir, L., Grabisch, M., & Marcel, F. (2013). Using a multi-criteria decision aid methodology to implement sustainable development principles within an organization. European Journal of Operational Research, 224, 603–613.
- Mohanty, B.K. (2008). Tranquility and anxiety in E-business – A fuzzy approach. Washington, DC: IEEE Computer Society.
- Mohanty, B.K., & Bhasker, B. (2005). Product classification in the Internet business – A fuzzy approach. Decision Support System, 38, 611–619.
- Moser, B., Tsiporkova, E., & Peter Klement, E. (1999). Convex combinations in terms of triangular norms: A characterization of idempotent, bisymmetrical and self-dual compensatory operators. Fuzzy Sets and Systems, 104, 97–108.
- Rao, J., & Roy, N. (1990). Use of tranquility in determining the numerical compensation for a fuzzy multi criteria decision making problem. Computers and Operations Research, 17(1), 97–103.
- Rao, J., Tiwari, R., & Mohanty, B.K. (1988). A method for finding numerical compensation for fuzzy multicriteria decision problem. Fuzzy Sets and Systems, 25, 33–41.
- Saaty, T. (1978). Exploring the interface between the hierarchies, multiple objectives and fuzzy sets. Fuzzy Sets and Systems, 1, 57–68.
- Shih, H.-S., & Lee, E.S. (2000). Compensatory fuzzy multiple level decision making. Fuzzy Sets and Systems, 114, 71–87.
- Song, J., Jones, D., & Gudigantala, N. (2007). The effects of incorporating compensatory choice strategies in Web-based consumer decision support systems. Decision Support Systems, 43, 359–374.
- Werners, B. (1988). Aggregation models in mathematical programming. In G. Mitra (Ed.), Mathematical models for decision support (pp. 295–305). Berlin: Springer.
- Yager, R. (1988). On ordered weighted averaging aggregation operators in multicriteria decision making. IEEE Transactions on Systems, Man and Cybernetics, 18(1), 183–190.
- Yager, R.R. (1982). Measuring tranquility and anxiety in decision making: An application of fuzzy sets. International Journal of General Systems, 8, 139–146.
- Yager, R.R. (1993). Families of OWA operators. Fuzzy Sets and Systems, 59(2), 125–148.
- Zimmermann, H.-J. (1978). Fuzzy programming and linear programming with several objective functions. Fuzzy Sets and Systems, 1, 45–55.
- Zimmermann, H.-J., & Zynso, P. (1980). Latent connectives in human decision making. Fuzzy Sets and Systems, 4, 37–51.