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：孟祥云”文章。

　　孟祥云

　　博士 、副教授

　　基本信息

　　办公电话：电子邮件： xymeng1@bjtu.edu.cn

　　通讯地址：邮编：

　　教育背景

　　2011.09 - 2016.07 北京大学，计算数学，直博

　　2007.09 - 2011.07 吉林大学，信息与计算科学，本科

　　工作经历

　　2021.01 至今 北京交通大学，副教授

　　2019.07 - 2020.12 北京交通大学，讲师

　　2018.09 - 2018.12 University of Limerick，访问学者

　　2016.07 - 2019.07 中国工程物理研究院，博士后

　　研究方向

　　计算数学

　　应用数学

　　招生专业

　　数学硕士

　　科研项目

　　国家自然科学基金项目、基本科研业务费项目等

　　教学工作

　　本科生课程：《数值计算》(信息与计算科学专业、数据科学专业、詹天佑学院、交通运输学院)、《深度学习》、《数学建模》等

　　研究生课程：《数值分析》(校公共基础课)、《有限元方法及其应用》等

　　论文/期刊

　　Selected publications:

　　Kopteva N, Meng X. Error analysis for a fractional-derivative parabolic problem on quasi-graded meshes using barrier functions, SIAM Journal on Numerical Analysis, 2020, 58(2): 1217-1238.

　　Meng X, Stynes M. Barrier function local and global analysis of an L1 finite element method for a multiterm time-fractional initial-boundary value problem. Journal of Scientific Computing, 2020, 84(1): 1-16.

　　Huang C, Liu X, Meng X, Stynes M. Error analysis of a finite difference method on graded meshes for a multiterm time-fractional initial-boundary value problem. Computational Methods in Applied Mathematics, 2020, 20(4): 815-825.

　　Ren H, Meng X, Liu R, Hou J, Yu Y. A class of improved fractional physics informed neural networks. Neurocomputing, 2023, 562: 126890.

　　Hou J, Yu Y, Wang J, Ren H, Meng X. Local analysis of L1-finite difference method on graded meshes for multi-term two-dimensional time-fractional initial-boundary value problem with Neumann boundary conditions. Computers and Mathematics with Applications, 2024, 157: 209-214.

　　Meng X, Gracia JL, Stynes M. Local analysis of an L1/finite element method for a time-fractional singularly perturbed reaction-diffusion problem. Numerical Algorithms, 2025.

　　Meng X, Stynes M. Balanced-Norm and Energy-Norm Error Analyses for a Backward Euler/FEM Solving a Singularly Perturbed Parabolic Reaction-Diffusion Problem. Journal of Scientific Computing, 2022, 92(2): 67.

　　Meng X, Stynes M. Balanced and energy norm error bounds for a spatial FEM with Crank-Nicolson and BDF2 time discretisation applied to a singularly perturbed reaction-diffusion problem. Numerical Algorithms, 2023: 1-22.

　　Meng X, Stynes M. Convergence analysis of the Adini element on a Shishkin mesh for a singularly perturbed fourth-order problem in two dimensions. Advances in Computational Mathematics, 2019, 45(2): 1105-1128.

　　Meng X, Stynes M. Uniform error analysis of a rectangular Morley finite element method on a Shishkin mesh for a 4th-order singularly perturbed boundary value problem. Computers and Mathematics with Applications, 2026.

　　Wang Y, Meng X, Li Y. The finite volume element method on the shishkin mesh for a singularly perturbed reaction–diffusion problem. Computers and Mathematics with Applications, 2021, 84: 112-127.

　　Wang Y, Meng X, Li Y. The Bogner-Fox-Schmit Element Finite Volume Methods on the Shishkin Mesh for Fourth-Order Singularly Perturbed Elliptic Problems. Journal of Scientific Computing, 2022, 93(1): 4.

　　Wang Y, Li Y, Meng X. An upwind finite volume element method on a Shishkin mesh for singularly perturbed convection–diffusion problems. Journal of Computational and Applied Mathematics, 2023: 115493.

　　Meng X, Stynes M. Energy-norm and balanced-norm supercloseness error analysis of a finite volume method on Shishkin meshes for singularly perturbed reaction–diffusion problems. Calcolo, 2023, 60(40): 1-37.

　　Liu S, Meng X, Zhai Q. Convergence analysis of a weak Galerkin finite element method on a Shishkin mesh for a singularly perturbed fourth-order problem in 2D. Journal of Computational and Applied Mathematics, 2025, 457: 116324.

　　Liu S, Meng X, Zhai Q. Convergence analysis of a weak Galerkin finite element method on a Bakhvalov-type mesh for a singularly perturbed convection-diffusion equation in 2D. Advances in Applied Mathematics and Mechanics, 2025.

　　Meng X, Yang X, Zhang S. Convergence analysis of the rectangular Morley element scheme for second order problem in arbitrary dimensions. Science China Mathematics, 2016, 59: 2245-2264.

　　Meng X, Stynes M. The Green's function and a maximum principle for a Caputo two-point boundary value problem with a convection term. Journal of Mathematical Analysis and Applications, 2018, 461(1): 198-218.

　　Meng X, Stynes M. Green's functions, positive solutions, and a Lyapunov inequality for a Caputo fractional-derivative boundary value problem. Fractional Calculus and Applied Analysis, 2019, 22(3): 750-766.

　　以上就是小编为大家分享的：“北京交通大学硕士研究生导师信息：孟祥云”，更多研究生导师信息，欢迎继续浏览新东方在线研究生导师频道。