(1) Shanshan Tong, Wei Wang, Chaofeng Dong. A data-driven Kaczmarz iterative regularization method with non-smooth constraints for ill-posed problems. Applied Numerical Mathematics, 2023, 192: 152-178.
(2) Shanshan Tong,Wei Wang, Zhenwu Fu, Bo Han. Iterative Runge-Kutta-type methods with convex penalty for inverse problems in Hilbert spaces. CSIAM Transactions on Applied Mathematics, 2023, 4(2), pp 225-255.
(3) Guangyu Gao, Bo Han, Zhenwu Fu, Shanshan Tong*. A fast data-driven iteratively regularized method with convex penalty for solving ill-posed problems[J]. SIAM Journal on Imaging Sciences, 2023, 16(2): 640-670.
(4) Min Zhong, Wei Wang, Shanshan Tong. An asymptotical regularization with convex constraints for inverse problems, Inverse Problems, 2022, 38(4): 045007.
(5) Guangyu Gao, Bo Han, Shanshan Tong. A fast two-point gradient algorithm based on sequential subspace optimization method for nonlinear ill-posed problems. Mathematics and Computers in Simulation, 2022, 192: 221-245.
(6) Shanshan Tong, Wei Wang, Bo Han. Accelerated homotopy perturbation iteration method for a non-smooth nonlinear ill-posed problem. Applied Numerical Mathematics, 2021, 169: 122-145.
(7) Guangyu Gao, Bo Han, Shanshan Tong. A projective two-point gradient Kaczmarz iteration for nonlinear ill-posed problems. Inverse Problems, 2021, 37(7): 075007.
(8) Ruixue Gu, Bo Han, Shanshan Tong, Yong Chen. An accelerated Kaczmarz type method for nonlinear inverse problems in Banach spaces with uniformly convex penalty. Journal of Computational and Applied Mathematics, 2021, 385: 113211.
(9) Shanshan Tong, Bo Han, Jinping Tang. A projective averaged Kaczmarz iteration for nonlinear ill-posed problems. Inverse Problems,2020, 36(9): 095012.
(10) Haie Long, Bo Han, Shanshan Tong. A proximal regularized Gauss-Newton-Kaczmarz method and its acceleration for nonlinear ill-posed problems. Applied Numerical Mathematics, 2020, 151: 301-321.
(11) ShanshanTong, Bo Han, Haie Long, Ruixue Gu. An accelerated sequential subspace optimization method based on homotopy perturbation iteration for nonlinear ill-posed problems. Inverse Problems, 2019, 35(12): 125005.
(12) Haie Long; Bo Han; Shanshan Tong. A new Kaczmarz type method and its acceleration for ill-posed problems. Inverse Problems, 2019, 35(5): 055004.
(13) Shanshan Tong, Bo Han, Yong Chen, Jinping Tang, Bo Bi, Ruixue Gu. RTE-based parameter reconstruction with TV+L1 regularization. Journal of Computational and Applied Mathematics, 2018, 337: 256-273.
(14) Shanshan Tong, Bo Han, Jinping Tang. Edge-guided TVp regularization for diffuse optical tomography based on radiative transport equation. Inverse Problems, 2018, 34:115009.
会议报告
(15) Shanshan Tong, An accelerated sequential subspace optimization method based on homotopy perturbation iteration for nonlinear ill-posed problems. The Fifth International Symposium on Inverse Problems, Design and Optimization (IPDO2019), China, Tianjin, 2019.9.24-2019.9.26.
(16) 佟珊珊,Edge-guided TVp regularization for diffuse optical tomography based on radiative transport equation,第十届全国反问题学术年会,长春,2018.5.28- 2018.5.31
教学论文
(17) 佟珊珊, 陈森, 路宽.高等数学教学优化效果的策略研究[J].黑龙江科学,2021,12(11):3.
(18) 佟珊珊,路宽.浅谈数学史在高等数学教学的渗透策略[J].中国教工,2021,615(29):331.
(19) 佟珊珊,武瑛. 二元函数极值的充分条件与曲面凹凸的关系[J].高等数学研究,2022, 2:42-44.
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