东南大学管理科学与工程系导师介绍：刘新旺

　　►专著及论文
　　[1] Liu X.W. and Wang Y.M., An analytical solution method for the generalized fuzzy weighted average problem. International Journal of Uncertainty Fuzziness and Knowledge-Based Systems, 2013. 21(3): 455-480.
　　[2] Liu X.W. and Yu S., On the Stress Function-Based OWA Determination Method With Optimization Criteria. IEEE Transactions on Systems Man and Cybernetics Part B-Cybernetics, 2012. 42(1): 246-257.
　　[3] Liu X.W., Pan Y.W., Xu Y.J., and Yu S., Least square completion and inconsistency repair methods for additively consistent fuzzy preference relations. Fuzzy Sets and Systems, 2012. 198: 1-19.
　　[4] Liu X.W., Mendel J.M., and Wu D.R., Study on enhanced Karnik-Mendel algorithms: Initialization explanations and computation improvements. Information Sciences, 2012. 184(1): 75-91.
　　[5] Liu X.W., Mendel J.M., and Wu D.R., Analytical solution methods for the fuzzy weighted average. Information Sciences, 2012. 187: 151-170.
　　[6] Liu X.W., Models to determine parameterized ordered weighted averaging operators using optimization criteria. Information Sciences, 2012. 190: 27-55.
　　[7] Liu X., Continuous Karnik-Mendel Algorithms and Their Generalizations, in Advances in Type-2 Fuzzy Sets: Theory and Applications, A. Sadeghian, J.M. Mendel, and H. Tahayori, Editors. 2012, Springer.
　　[8] Liu X., Models to determine parameterized ordered weighted averaging operators using optimization criteria. Information Sciences, 2012. 190(1): 27-55.
　　[9] Liu X.W. and Mendel J.M., Connect Karnik-Mendel Algorithms to Root-Finding for Computing the Centroid of an Interval Type-2 Fuzzy Set. IEEE Transactions on Fuzzy Systems, 2011. 19(4): 652-665.
　　[10] Liu X., A Review of the OWA Determination Methods: Classification and Some Extensions, in Recent Developments in the OrderedWeighted Averaging Operators: Theory and Practice, R.R. Yager, J. Kacprzyk, and G. Beliakov, Editors. 2011, Springer-Verlag: Berlin Heidelberg. p. 49-90.
　　[11] Liu X.W., The orness measures for two compound quasi-arithmetic mean aggregation operators. International Journal of Approximate Reasoning, 2010. 51(3): 305-334.
　　[12] Liu X.W., The relationships between two variability and orness optimization problems for owa operator with RIM quantifier extensions. International Journal of Uncertainty Fuzziness and Knowledge-Based Systems, 2010. 18(5): 515-538.
　　[13] Liu X., The orness measures for two compound quasi-arithmetic mean aggregation operators. International Journal of Approximate Reasoning, 2010. 51(3): 305-334.
　　[14] Liu X., The relationships between two variability and orness optimization problems for OWA operator with RIM quantifier extensions. International Journal of Uncertainty, Fuzziness and Knowlege-Based Systems, 2010. 18(5): 515-538.
　　[15] Liu X.W. and Lou H.W., On the equivalence of some approaches to the OWA operator and RIM quantifier determination. Fuzzy Sets and Systems, 2008. 159(13): 1673-1688.
　　[16] Liu X.W. and Han S.L., Orness and parameterized RIM quantifier aggregation with OWA operators: A summary. International Journal of Approximate Reasoning, 2008. 48(1): 77-97.
　　[17] Liu X.W., A general model of parameterized OWA aggregation with given orness level. International Journal of Approximate Reasoning, 2008. 48(2): 598-627.
　　[18] Xinwang Liu H.L., Parameterized approximation of fuzzy number with minimum variance weighting functions. Mathematical and Computer Modelling, 2007. 46(11-12): 1398–1409.
　　[19] Liu X.W., The solution equivalence of minimax disparity and minimum variance problems for OWA operators. International Journal of Approximate Reasoning, 2007. 45(1): 68-81.
　　[20] Liu X., Parameterized defuzzification with maximum entropy weighting function-Another view of the weighting function expectation method. Mathematical and Computer Modelling, 2007. 45(1-2): 177-188.
　　[21] Liu X., Parameterized additive neat OWA operators with different orness levels. International Journal of Intelligent Systems 2006. 21(10): 1045-1072.
　　[22] Liu X.W., Some properties of the weighted OWA operator. IEEE Transactions on Systems Man and Cybernetics Part B-Cybernetics, 2006. 36(1): 118-127.
　　[23] Liu X.W., On the maximum entropy parameterized interval approximation of fuzzy numbers. Fuzzy Sets and Systems, 2006. 157(7): 869-878.
　　[24] Liu X.W., An orness measure for quasi-arithmetic means. IEEE Transactions on Fuzzy Systems, 2006. 14(6): 837-848.
　　[25] Liu X., On the properties of equidifferent OWA operators. International Journal of Approximate Reasoning, 2006. 43(1): 90-107