Weidong Zhao
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Date of Birth:1962-12-06
Gender:Male
Education Level:Postgraduate (Doctoral)
Alma Mater:Shandong University
Paper Publications
- [21] Shehu Maitama and Weidong Zhao. Beyond Sumudu transform and natural transform: J-transform properties and applications. The Journal of Applied Analysis and Computation, 10, 1223-1241, 2020.
- [22] Yu Fu , Weidong Zhao and Tao Zhou. Highly accurate numerical schemes for stochastic optimal control via FBSDEs. Numerical Mathematics. Theory, Methods and Applications, 13, 296-319, 2020.
- [23] Yabing Sun and Weidong Zhao. An explicit second-order numerical scheme for mean-field forward backward stochastic differential equations. Numerical Algorithms, 84, 253-283, 2020.
- [24] Yang Li , Jie Yang and Weidong Zhao. A new second-order one-step scheme for solving decoupled FBSDEs and optimal error estimates. East Asian Journal on Applied Mathematics, 10, 354-380, 2020.
- [25] Ying Liu , Yabing Sun and Weidong Zhao. A fully discrete explicit multistep scheme for solving coupled forward backward stochastic differential equations. Advances in Applied Mathematics and Mechanics, 12, 643-663, 2020.
- [26] Yabing Sun and Weidong Zhao. An explicit second order scheme for decoupled anticipated forward backward stochastic differential equations. East Asian Journal on Applied Mathematics, 10, 354-380, 2020.
- [27] Jie Yang , Weidong Zhao and Tao Zhou. A unified probabilistic discretization scheme for FBSDEs: stability, consistency, and convergence analysis. SIAM Journal on Numerical Analysis, 58, 2351-2375, 2020.
- [28] Xu Yang and Weidong Zhao. Finite element methods for nonlinear backward stochastic partial differential equations and their error estimates. Advances in Applied Mathematics and Mechanics, 12, 1457-1480, 2020.
- [29] Jie Yang , Weidong Zhao and Tao Zhou. Explicit deferred correction methods for second-order forward backward stochastic differential equations. Journal of Scientific Computing, 79, 1409-1432, 2019.
- [30] Shehu Maitama and Weidong Zhao. New Integral Transform: Shehu Transform a Generalization of Sumudu and Laplace Transform for Solving Differential Equations. International Journal of Analysis and Applications, 17, 167-190, 2019.