研究領(lǐng)域
◆ 微分方程數(shù)值解
◆ 相場模型的數(shù)值算法及應(yīng)用
◆ 非局部模型的數(shù)值算法及應(yīng)用
教育背景
◆ 2014年,,香港浸會大學(xué),,數(shù)學(xué)系,獲數(shù)學(xué)哲學(xué)博士學(xué)位,;
◆ 2010年,,浙江大學(xué),數(shù)學(xué)系,,獲數(shù)學(xué)學(xué)士學(xué)位,。
工作經(jīng)歷
◆ 2017年7月至今,南方科技大學(xué),,數(shù)學(xué)系,,助理教授 、副教授,;
◆ 2015年8月至2017年6月,,美國哥倫比亞大學(xué),應(yīng)用物理與應(yīng)用數(shù)學(xué)系,,博士后,;
◆ 2014年8月至2015年8月,,美國賓夕法尼亞州州立大學(xué),數(shù)學(xué)系,,博士后,。
榮譽與獲獎
◆ 2014年,香港浸會大學(xué),,亞坤內(nèi)地研究生獎,;
◆ 2014年,第十屆東亞工業(yè)與應(yīng)用數(shù)學(xué)學(xué)會學(xué)生論文獎,。
代表著作
Q. Du, J. Yang, and W. Zhang,
Numerical analysis on the uniform $L^p$-stability of Allen-Cahn equations, to appear in Int. J. Numer. Anal. Mod..
T. Hou, T. Tang and J. Yang,
Numerical analysis of fully discretized Crank--Nicolson scheme for fractional-in-space Allen-Cahn equations, J. Sci. Comput., doi:10.1007/s10915-017-0396-9.
Q. Du and J. Yang,
Fast and Accurate Implementation of Fourier Spectral Approximations of Nonlocal Diffusion Operators and its Applications, J. Comput. Phys., 332 (2017), 118-134.
Q. Du, Y. Tao, X. Tian and J. Yang,
Robust a posteriori stress analysis for approximations of nonlocal models via nonlocal gradients, Comp. Meth. Appl. Mech. Eng., 310 (2016), 605-627.
Q. Du and J. Yang,
Asymptotically compatible Fourier spectral approximations of nonlocal Allen-Cahn equations, SIAM J. Numer. Anal., 54(3) (2016), 1899-1919.
X. Feng, T. Tang and J. Yang,
Long time numerical simulations for phase-field problems using \emph{p}-adaptive spectral deferred correction methods, SIAM J. Sci. Comput., 37 (2015), A271-A294.
W. Zhang, J. Yang, J. Zhang, and Q. Du,
Artificial boundary conditions for nonlocal heat equations on unbounded domain, Comm. Comp. Phys., 21(1) (2017), 16-39.
J. Shen, T. Tang and J. Yang,
On the maximum principle preserving schemes for the generalized Allen-Cahn equation, Comm. Math. Sci., 14(6) (2016), 1517-1534.
Q. Du, J. Yang and Zhi Zhou,
Analysis of a nonlocal-in-time parabolic equations, Dis. Cont. Dyn. Sys. B, 22(2) (2017), 339-368.
T. Tang and J. Yang,
Implicit-explicit scheme for the Allen-Cahn equation preserves the maximum principle, J. Comput. Math., 34(5) (2016), 471-481.
X. Feng, T. Tang and J. Yang,
Stabilized Crank-Nicolson/Adams-Bashforth schemes for phase field models, East Asian Journal on Applied Mathematics, 3 (2013), pp. 59-80.
X. Feng, H. Song, T. Tang, and J. Yang,
Nonlinear stability of the implicit-explicit methods for the Allen-Cahn equation, Inverse Problems and Imaging, Volume 7 (2013), pp. 679 - 695.
