北京交通大学硕士研究生导师信息：张瑞丽

　　在读研期间，所有与你读研相关的事情，可能都需要经过你的导师同意，所以说，选择导师真的很重要，也希望大家能够认真对待这件事，怎样才能选择适合自己的导师呢?这就要我们提前做足功课，尽可能多的搜集有关你准备报考的导师的信息，下面新东方在线考研频道为大家分享：“北京交通大学硕士研究生导师信息：张瑞丽”文章。

　　张瑞丽

　　博士 、副教授

　　基本信息

　　办公电话：010-51688423电子邮件： zhangrl@bjtu.edu.cn

　　通讯地址：北京交通大学数学与统计学院邮编：100044

　　教育背景

　　2009.09-2014.07， 中国科学院数学与系统科学研究院，计算数学所，硕博连读

　　2005.09-2009.07，首都师范大学，数学科学学院，本科

　　工作经历

　　2014.09-2017.05， 中国科学技术大学，博士后

　　2017. 05-2018.12， 北京交通大学， 讲师

　　2019.01-至今，北京交通大学，副教授

　　2020.01-2020.03，柏林工业大学(访问学者);

　　中国系统仿真学会仿真算法专业委员会委员、青年工作委员会委员;

　　研究方向

　　计算数学

　　应用数学

　　招生专业

　　数学硕士

　　数学博士

　　科研项目

　　国家自然科学基金面上项目，2023/01-2026/12,70.24万元，在研，主持

　　人才基金，2017/10-2019/10，10万元，已结题，主持

　　第58批国家博士后科学基金面上项目(二等)，2016/01-2017/12，5万元，已结题，主持

　　国家自然科学基金青年基金，2016/01-2018/12，25.2万元，已结题，主持

　　国家自然科学基金面上项目，2016/01-2019/12，76.8万元，已结题，参加

　　科技部国家磁约束核聚变能发展专项,2015/01-2019/12，4000万元，已结题，参加

　　教育部中央高校科研业务专项资助，2015/01-2016/12，5万元，已结题，主持

　　科技部国家磁约束核聚变能发展专项(人才课题)，2014/01-2018/12，240万元，已结题，参加

　　教学工作

　　论文/期刊

　　[25] R. Zhang, J. Liu, T. Liu, W. Li and X. Wang, Canonical Hamiltonian Guiding Center Dynamics and Its Intrinsic Magnetic Moment, Frontiers of Physics, 2026, 21(2):026200.

　　[24] R. Zhang, T. Liu, B. Wang, J. Liu, and Y. Tang, Structure-preserving algorithm and its error estimate for the relativistic charged-particle dynamics under the strong magnetic field, Journal of Scientific Computing, 2024, 100(3):1-29.

　　[23] L. Brugnano, F. Iavernaro, R. Zhang, Arbitrarily high-order energy-preserving methods for simulating the gyrocenter dynamics of charged particles, Journal of Computational and Applied mathematics, 2020, 380:112994.

　　[22] R. Zhang, H. Qin, J. Xiao, PT-symmetry entails pseudo-Hermiticity regardless of diagonalizability, Journal of Mathematical Physics, 2020, 61: 012101.

　　[21] R. Zhang, J. Liu, H. Qin, Y. Tang, Energy-preserving algorithm for gyrocenter dynamics of charged particles, Numerical Algorithm, 2019, 81: 1521-1530.

　　[20] H. Qin, R. Zhang, A.S. Glasser, J. Xiao, Kelvin-Helmholtz instability is the result of parity-time symmetry breaking, Phys. Plasma, 2019, 26: 032102.

　　[19] R. Zhang, Y. Wang, Y. He, J. Xiao, J. Liu, H. Qin, Y.Tang, Explicit symplectic algorithms based on generating function for relativistic charged particle dynamics in time-dependent electromagnetic field, Phys. Plasma, 2018, 25: 022117.

　　[18] J. Xiao, H. Qin*, J. Liu, R. Zhang, Local energy conservation law for spatially-discretized Hamiltonian Vlasov-Maxwell system, Phys. Plasma, 2017, 24: 062112.

　　[17] X. Tu, B. Zhu, Y. Tang, H. Qin, J. Liu* and R. Zhang, A family of new explicit, revertible, volume-preserving numerical schemes for the system of Lorentz force, Phys. Plasma, 2016, 23: 122514.

　　[16] J. Xiao, H. Qin*, P. Morrison, J. Liu, Z. Yu, R. Zhang, Y. He, Explicit high-order noncanonical symplectic algorithms for ideal two-fluid systems, Phys. Plasma, 2016, 23: 112107.

　　[15] B. Zhu, Z. Hu, Y. Tang*, R. Zhang, Symmetric and symplectic methods for gyrocenter dynamics in time-independent magnetic fields, International Journal of Modeling, Simulation, and Scientific Computing, 2016(7), 1650008

　　[14] R. Zhang, H. Qin, Y. Tang, J. Liu, Y. He and J. Xiao, Explicit algorithms based on generating functions for charged particle dynamics, Physical Review E 94, 013205, (2016).

　　[13] R. Zhang, H. Qin, R. C. Davidson, J. Liu, and J. Xiao, On the structure of the two-stream instability–complex G-Hamiltonian structure and Krein collisions between positive- and negativeaction modes, Phys. Plasma 23, 072111, (2016).

　　[12] R. Zhang, J. Liu, H. Qin, Y. Tang, Y. He and Y. Wang, Application of Lie algebra in constructing volume-preserving algorithms for charged particles dynamics, Communications in Computational Physics, 19 (2016) 1397-1408.

　　[11] R. Zhang, Y. Tang, B. Zhu, X. Tu and Y. Zhao, Convergence analysis of the formal energies of symplectic methods for Hamiltonian systems, SCIENCE CHINA Mathematics, 59 (2016) 379-396.

　　[10] Y. He, Y. Sun, R. Zhang, Y. Wang, J. Liu and H. Qin, High order volume-preserving algorithms for relativistic charged particles in general electromagnetic fields, Phys. Plasma 23, 092109 (2016).

　　[9] B. Zhu, R. Zhang, Y. Tang, X. Tu and Y. Zhao, Splitting K-symplectic methods for non-canonical separable Hamiltonian problems, Journal of Computational Physics 322, 387-399, (2016).

　　[8] Y. He, H. Qin, Y. Sun, J. Xiao, R. Zhang and J. Liu, Hamiltonian time integrators for Vlasov-Maxwell equations, Phys. Plasmas 22(12), 124503 (2015).

　　[7] J. Xiao, H. Qin, J. Liu, Y. He, R. Zhang and Y. Sun, Explicit high-order non-canonical symplectic particle-in-cell algorithms for Vlasov-Maxwell systems, Phys. Plasmas 22, 112504 (2015).

　　[6] H. Qin, J. Liu, J. Xiao, R. Zhang, Y. He, Y. Wang, J. W. Burby, L. Ellison and Y. Zhou, Canonical symplectic particle-in-cell method for long-term large-scale simulations of the Vlasov-Maxwell system, Nuclear Fusion 56(1), 014001, (2015).

　　[5] H. Qin, Y. He, R. Zhang, J. Liu, J. Xiao and Y. Wang, Comment on “Hamiltonian splitting for the Vlasov-Maxwell equations”, Journal of Computational Physics 297, 721-723, (2015).

　　[4] R. Zhang, J. Liu, H. Qin, Y. Wang, Y. He and Y. Sun, Volume-preserving algorithm for secular relativistic dynamics of charged particles, Phys. Plasmas 22, 044501 (2015).

　　[3] R. Zhang, J. Liu, Y. Tang, H. Qin, J. Xiao and B. Zhu, Canonicalization and symplectic simulation of the gyrocenter dynamics in time-independent magnetic fields, Phys. Plasmas 21, 032504 (2014).

　　[2] H. Fang, G. lin and R. Zhang, The first-order symplectic Euler method for simulation of GPR wave propagation in pavement structure, IEEE Transaction on geosciences and remote sensing, Vol. 51, No.1, (2013) 93-98.

　　[1] R. Zhang, J. Huang, Y. Tang and L. Vázquez, Revertible and Symplectic Methods for the Ablowitz-Ladik Discrete Nonlinear Schrodinger Equation, GCMS’11 Proceeding of the 2011 Grand Challenges on Modeling and Simulation Conference, 297-306, (2011).

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