-
徐海燕
(南京航空航天大學教授)
鎖定
- 中文名
- 徐海燕
- 外文名
- Haiyan Xu
- 國 籍
- 中國
- 出生日期
- 1963年
- 畢業院校
- 南京大學
徐海燕人物經歷
1. 南京航空航天大學經濟與管理學院教授,博士生導師
2. 2009—2010:博士後,加拿大滑鐵盧大學工程學院系統設計工程系
3. 2006—2009:博士,加拿大滑鐵盧大學工程學院系統設計工程系
4. 2004—2006:碩士, 加拿大滑鐵盧大學數學與計算機學院組合優化系
5. 1980—1984:本科,南京大學數學系
徐海燕教育科研
徐海燕科研綜述
徐海燕教授多年來一直從事衝突分析圖模型(Graph Model for Conflict Resolution, GMCR)的理論方法與應用研究,主持過國家自然科學基金項目、江蘇省高校哲學社會科學研究重點項目、航空科學基金項目、國家來華留學英語授課品牌課程等重要課題,在European Journal of Operational Research,Theory and Decision, Group Decision and Negotiation, IEEE Transactions on Systems, Man, and Cybernetics等國外權威期刊和國際會議上發表學術論文30多篇,其中SCI/SSCI期刊論文10餘篇
[1-5]
[8-10]
。
徐海燕科研項目
2.主持江蘇省高校哲學重點項目“全球背景下江蘇省財政收入風險預警與防範決策機制的研究”。
3.主持航空科學基金項目“基於不確定性的航空武器裝備並行協同研製中的多層次衝突分析”。
4.主持國家自然基金面上項目“基於圖模型和矩陣表達的衝突分析研究及決策支持系統構建”。(完成)
5.主持南航科研啓動基金項目“中小型企業與民營企業的併購策略研究”。(完成)
6.主持南航科研項目“不確定環境下結盟決策研究及應用”。(完成)
7.主持加拿大匯豐銀行信息支持系統用户評估分析軟件包的設計項目。(完成)
徐海燕發表論著
[1] Haiyan Xu, D.M. Kilgour, K.W. Hipel, and Edward A. McBean, T, Theory and Decision, 76, pp. 147-171, 2014/2.(SSCI)
[11]
[2] Haiyan Xu, D.M. Kilgour, K.W. Hipel, and Edward A. McBean, Theory and Application of Conflict Resolution with Hybrid Preference in Colored Graphs, Applied Mathematical Modelling; 37 (2013) 989-1003. (SCI)
[12]
[3] Haiyan Xu, D. M. Kilgour, and K. W. Hipel, Matrix Representation of Conflict Resolution in Multiple-Decision-Maker Graph Models with Preference Uncertainty, Group Decision and Negotiation(GDN), 20 (6), 2011, 755-779. (SSCI)
[13]
[4] Haiyan Xu, K. W. Hipel, D. M. Kilgour, and Ye Chen, Combining Strength and Uncertainty for Preferences in the Graph Model for Conflict Resolution with Multiple Decision Makers, Theory and Decision, 69 (4), 497-521, 2010. (SSCI)
[14]
[5]Haiyan Xu, D.M. Kilgour, K. W. Hipel, and Graeme Kemkes, Using Matrices to Link Conflict Evolution and Resolution in a Graph Model,European Journal of Operational Research, 207 (2010) 318-329. (SCI)
[15]
[6] Haiyan Xu, D. M. Kilgour, and K. W. Hipel, Matrix representation and extension of coalition analysis in group decision support, Computers and Mathematics with Applications, 60 (2010) 1164-1176. (SCI)
[16]
[7] Haiyan Xu, D. M. Kilgour, and K. W. Hipel. An Integrated Algebraic Approach to Conflict Resolution with Three-level Preference, Applied Mathematics and Computation 216, 693-707, 2010. (SCI)
[17]
[8]Haiyan Xu, K. W. Hipel, and D. M. Kilgour, Multiple Levels of Preference in Interactive Strategic Decisions, Discrete Applied Mathematics 157, pp. 3300-3313, 2009.(SCI)
[18]
[9] Haiyan Xu, Kevin W. Li, D. M. Kilgour, and K. W. Hipel, A Matrix-based Approach to Searching Colored Paths in a Weighted Colored Multidigraph, Applied Mathematics and Computation, 215, pp. 353-366, 2009. (SCI)
[19]
[10] Haiyan Xu, K. W. Hipel, and D. M. Kilgour, Matrix Representation of Solution Concepts in Multiple Decision Maker Graph Models, IEEE Transactions on Systems, Man, and Cybernetics-Part A: Systems and Humans, 39 (1), pp. 96-108, 2009.(SCI)
[20]
[11] Haiyan Xu, Kevin W. Li, K. W. Hipel, and D. M. Kilgour, A Matrix Approach to Status Quo Analysis in the Graph Model for Conflict Resolution, Applied Mathematics and Computation, 212 (2), pp. 470-480, 2009.(SCI)
[21]
徐海燕榮譽獎勵
- 參考資料
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- 1. 管理科學與工程系-徐海燕 .南京航空航天大學經濟與管理學院[引用日期2018-02-01]
- 2. 師資隊伍-徐海燕 .南京航空航天大學經濟與管理學院[引用日期2018-02-01]
- 3. 博雅論壇第86期:衝突分析理論、應用以及系統開發的新發展 .福州大學經濟與管理學院[引用日期2018-02-01]
- 4. 海大人文講壇2017年第三講 .中國海洋大學[引用日期2018-02-01]
- 5. Biography-徐海燕 .Science Research[引用日期2018-02-01]
- 6. 教師團隊>>主講教師>>徐海燕 .南京航空航天大學經濟與管理學院高等運籌學[引用日期2018-02-01]
- 7. 個人簡介-徐海燕 .漢斯出版社[引用日期2018-02-01]
- 8. 徐海燕:七年又七年,我仍然是南航的"新兵" .南航新聞網[引用日期2018-02-01]
- 9. 通過結項驗收的江蘇高校哲學社會科學重大項目與重點項目 .江蘇省教育網[引用日期2018-02-01]
- 10. 2018國家自然科學基金在線查詢 .生物谷[引用日期2018-02-01]
- 11. Theory and implementation of coalitional analysis in cooperative decision making .Springer[引用日期2018-02-01]
- 12. Theory and application of conflict resolution with hybrid preference in colored graphs .ScienceDirect[引用日期2018-02-01]
- 13. Matrix Representation of Conflict Resolution in Multiple-Decision-Maker Graph Models with Preference Uncertainty .Springer[引用日期2018-02-01]
- 14. Combining strength and uncertainty for preferences in the graph model for conflict resolution with multiple decision makers .Springer[引用日期2018-02-01]
- 15. Using matrices to link conflict evolution and resolution in a graph model .ScienceDirect[引用日期2018-02-01]
- 16. Matrix representation and extension of coalition analysis in group decision support, Computers and Mathematics with Applications .ScienceDirect[引用日期2018-02-01]
- 17. An integrated algebraic approach to conflict resolution with three-level preference .ScienceDirect[引用日期2018-02-01]
- 18. Multiple Levels of Preference in Interactive Strategic Decisions .ScienceDirect[引用日期2018-02-01]
- 19. A matrix-based approach to searching colored paths in a weighted colored multidigraph .ScienceDirect[引用日期2018-02-01]
- 20. Matrix Representation of Solution Concepts in Multiple Decision Maker Graph Models .IEEE[引用日期2018-02-01]
- 21. A Matrix Approach to Status Quo Analysis in the Graph Model for Conflict Resolution .ScienceDirect[引用日期2018-02-01]
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