沈万芳,女,汉族,1979年11月出生,山东潍坊人,中共党员,理学博士,管理学博士后,三级教授,博士生导师。现任山东省区块链金融重点实验室常务副主任,山东财经大学学术委员会委员,山东财经大学-北京外国语大学-英国Kent大学决策与评价联合研究中心主任,中国工业与应用数学学会金融科技专委会常务理事,中国优选法统筹法与经济数学研究会评价方法与应用分会常务理事,DEAIC国际会议理事等。
主要研究方向:区块链金融、评价方法与应用、金融最优控制问题、可持续发展评价等。
教学方面:先后为本科生主讲过《微积分》,《线性代数》,《概率论与数理统计》,《数值计算方法》,《有限元方法》等课程,为研究生主讲过《数量经济模型》、《数据包络分析评价方法及其应用》等。
科研方面:发表高水平学术论文20余篇,主持国家自然科学基金项目3项、山东省科技发展计划项目1项、山东省统计局重点课题1项、服务社会横向课题1项;作为主要参与人参与山东社科智库沙龙调研咨询项目两项;作为负责人获批山东省高等学校青年创新人才引育计划-可持续发展评价与优化研究团队、山东财经大学优势学科人才团队。获山东财经大学优秀科研成果奖一等奖科研奖励7项。担任国际著名期刊《International Journal of Numerical Analysis and Modeling》、《International Journal of Computing Methods》《中国管理科学》等的审稿人。
1. 主持及参与的部分相关课题
[1] 国家自然科学基金面上项目,状态受限随机积微分方程最优控制的高效自适应方法研究, 2020-01至2023-12,主持
[2] 国家自然科学基金青年基金项目, 具有随机场系数的积分微分方程最优控制问题的高效数值方法研究,2016-01至2018-12,,主持
[3] 国家自然科学基金数学天元基金项目,抛物型积分微分方程最优控制问题的高效有限元方法,2014-01至2014-12,主持
[4] 国家自然科学基金面上项目,随机偏微分方程最优控制问题的基于分层张量表示的自适应有限元方法,2019-01至2022-12,参与,第三位
[5] 山东省科技发展计划项目,自适应计算技术在具有记忆特性的复杂工程最优控制中的应用,2011-11至2013-11,主持
[6] 山东省高等学校青年创新人才引育计划,可持续发展评价与优化研究团队,2019-10至2022-12,主持
[7] 山东财经大学优势学科人才团队,经济金融大数据绩效分析与科学计算团队,2018-01至2020-12,主持
[8] 国家留学基金委公派访问学者(含博士后)项目, 英国肯特大学, 博士后, 起止年月:2015-01至2016-01
[9]山东财经大学青年骨干教师境外研修重点支持计划,2016-08至2017-08,主持
[10] 山东省统计局统计科研重点课题, KT13029, 基于DEA方法的山东省城镇化水平测度和经济发展关系的研究,2013-07至2014-09,主持
2. 代表性成果
[1]
[1] Wan-fang Shen, Da-qun Zhang , Wen-bin Liu , Guo-liang Yang, Increasing discrimination
of DEA evaluation by utilizing distances to anti-effificient frontiers, Computers &
Operations Research, 2016, 75: 163–173(SCI)
[2] Wanfang Shen, Liang Ge, Wenbin Liu, Stochastic Galerkin method for optimal control problem governed by random elliptic PDE with state constraints, Journal of Scientific Computing. 2019, 78(3): 1571-1600(SCI)
[3] Wanfang Shen, Liang Ge, Danping Yang, Wenbin Liu, Sharp a posteriori error
estimates for optimal control governed by parabolic integro-differential equations, Journal
of Scientific Computing, 2015, 65(1): 1-33. (SCI)
[4] Wanfang Shen, Liang Ge, On effective stochastic Galerkin finite element method for stochastic optimal control governed by integral-differential equations with random coefficients, Journal of Computational Mathematics, 2018, 36(2): 183-201.(SCI)
[5] W. F. Shen, T. J. Sun, B. X. Gong, W. B. Liu, Stochastic Galerkin method for constrained optimal control problem governed by an elliptic integro-differential PDE with stochastic coefficients, International Journal of Numerical Analysis and Modeling, 2015, 12(4): 593-616.(SCI)
[6] Wanfang Shen, Liang Ge, Danping Yang,Wenbin Liu, A priori error estimates of finite element methods for linear parabolic integro-differential optimal control problems, Advances in Applied Mathematics and Mechanics, 2014, 6(5): 552-569.(SCI)
[7] WF SHEN, Z.B ZHOU, PD LIU, QY JIN, WB LIU, AND HY NIU, A unified parallel DEA model and efficiency modeling of multi-activity and/or non-homogeneous activity, International Journal of Numerical Analysis and Modeling, 2018, 15(3): 370-391.(SCI)
[8] Wanfang Shen, Guoliang Yang, Zhongbao Zhou, Wenbin Liu, DEA models with Russell
measures, Annals of Operation Research, 2019, 278(1-2):337-359(SCI)
[9]Wanfang Shen, Full-discrete adaptive FEM for quasi-parabolic integro-differential PDE
constrained optimal control problem, Boundary Value Problems, 2016, 1-26, DOI: 10.1186/s13661- 016-0626-3(SCI)
[10] Wanfang Shen, Liang Ge, and Danping Yang, Finite element methods for optimal control
problems governed by linear quasi-parabolic integro-differential equations, International Journal of Numerical Analysis and Modeling, 2013, 10(3): 536-550(SCI)
[11] Wanfang Shen, Danping Yang,Wenbin Liu, Optimal control problem governed by a linear
hyperbolic integro-differential equation and its finite element analysis, Boundary Value
Problems, 2014,173, DOI: 10.1186/s13661-014-0173-8(SCI)
[12] Du Ning, Shen Wanfang, A fast stochastic Galerkin method for a constrained optimal control problem governed by a random fractional diffusion equation, Journal of Computational Mathematics, 2018, 36(2): 259-275.(SCI)
[13] Wanfang Shen, Hua Su.Adaptive finite element method for optimal control problem governed by linear quasi-parabolic integro-differential equations. Abstract and Applied Analysis, Volume 2012,26 pages, doi:10.1155/2012/808514, 2012.(SCI)
[14] Wanfang Shen, A posteriori error estimates for a semidiscrete parabolic integro-differential
control on multimeshes, Discrete Dynamics in Nature and Society,Vol.2012,24 pages,
doi:10.1155/2012/481295, 2012.(SCI)[15] Wanfang Shen, Superconvergence of finite element methods for linear quasi-hyperbolic integro differential equations, 2011 Fourth International Conference on Information and Computing,212-215, DOI 10.1109/ICIC.2011.120, 2011.(EI)
[16] Wanfang Shen, Danping Yang, Generalized difference method for one-dimensional linear
quasi-parabolic integro-differential equations, 2011IEEE International Conference on Intelligent Computing And Intelligent Systems.
[17] Sun Tongjun,Shen Wanfang, Gong Benxue, Liu Wenbin, A priori error estimate of stochastic Galerkin method for optimal control problem governed by stochastic elliptic PDE with constrained control, Journal of Scientific Computing, 2016,67(2): 405-431(SCI)
[18] Benxue Gong, Tongjun Sun,Wanfang Shen, Wenbin Liu, A priori error estimate of stochastic Galerkin method for optimal control problem governed by random parabolic PDE with constrained control, International Journal of Computational Methods, 2016, 13(5): 1-26(SCI)
[19] Liu WB, Zhou ZB, Ma CQ, Liu DB,Shen, WF, Two-stage DEA models with undesirable inputintermediate-outputs, Omega-International Journal of Management Science, 2015,56: 74-87(SCI)
[20] Guoliang Yang,Wanfang Shen, Daqun Zhang, Wenbin Liu, Extended utility and DEA models without explicit input, Journal of the Operational Research Society, 2014(65): 1212-1220(SCI)
