基本情况

刘新旺,东南大学经济管理学院管理科学与工程系教授,博士生导师。江苏省“333高层次人才培养工程”首批中青年科学技术带头人。2006年入选教育部“新世纪优秀人才支持计划”。中国运筹学会青年工作委员会委员和中国运筹学会不确定系统分会常务理事。美国南加州大学访问教授。

 

研究领域

多准则决策和信息融合

 

教育背景

1996年至1999 博士,东南大学经济管理学院

1993年至1996 硕士,东南大学经济管理学院

1987年至1991 学士,河南师范大学数学系

 

论文发表

  1. Xinwang Liu, Models to determine parameterized ordered weighted averaging operators using optimization criteria, Information Sciences (2012), doi:10.1016/ j.ins.2011.12.007
  2. Xinwang Liu, Shui Yu, On the Stress Function-Based OWA Determination Method With Optimization Criteria, IEEE Transactions On Systems, Man, and CyberneticsPart B: Cybernetics, 42 (2012), 1, 246-257
  3. Xinwang Liu, Jerry M. Mendel, Dongrui Wu,Analytical Solution Methods for the Fuzzy Weighted Average Information Science, 187 (2012), 151-170
  4. Xinwang Liu, Jerry M. Mendel,Dongrui Wu, Study on enhanced KarnikMendel algorithms: Initialization explanations and computation improvements, Information Sciences 184 (2012), 1, 75-91
  5. Xinwang Liu, and Jerry M. Mendel, Connect Karnik-Mendel Algorithms to Root-Finding for Computing the Centroid of an Interval Type-2 Fuzzy Set, IEEE Transactions on Fuzzy Systems, 19 (2011), 4, 652-665
  6. X. Liu, et al., Least square completion and inconsistency repair methods for additively consistent fuzzy preference relations, Fuzzy Sets and Systems (2011), doi:10.1016/j.fss.2011.11.009
  7. Xinwang Liu, Efficient Centroid Computation of General Type-2 Fuzzy Sets with Linear Secondary Membership Function, 2011 IEEE International Conference on Fuzzy Systems, p.2163-2169
  8. Xinwang Liu, and Jerry M. Mendel, Some Extensions of the Karnik-Mendel Algorithms for Computing an Interval Type-2 Fuzzy Set Centroid, 2011 IEEE Symposium Series on Computational Intelligence, p. 74-81
  9. Xinwang. Liu, A review of the OWA determination methods: Classification and some extensions, in Recent Developments in the Ordered Weighted Averaging Operators: Theory And Practice, R. R. Yager, J. Kacprzyk, and G. Beliakov, Editors. 2011, Springer-Verlag: Berlin Heidelberg. p. 49-90. (Invited Book Chapter)
  10. Xinwang Liu,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, 18 (2010), 5515-538. (SCI, EI收录)
  11. Xinwang Liu, The orness measures for two compound quasi arithmetic mean aggregation operators, International Journal of Approximate Reasoning, 51 (2010),3, 305-334. (SCI, EI收录)
  12. Xinwang Liu, Parameterized defuzzification with continuous weighted quasi-arithmetic meansAn extension, Information Sciences, 179 (2009), 8, 1193-1206. (SCI, EI收录)
  13. Xinwang Liu, On the methods of OWA operator determination with different dimensional instantiations, 2009, Sixth International Conference on Fuzzy Systems and Knowledge Discovery, 201-204. (EI收录)
  14. Xinwang Liu, A general model of parameterized OWA aggregation with given orness level, International Journal of Approximate Reasoning, 48 (2008), 2, 598-627. (SCI, EI收录)
  15. Xinwang Liu, Hongwei Lou, On the equivalence of some approaches to the OWA operator and RIM quantifier determination, Fuzzy Sets and Systems, 159 (2008), 13, 1673-1688. (SCI, EI收录)