1984年5月出生,博士,365英国上市副教授,硕士生导师,希腊约阿尼纳大学访问学者,入选英国365集团公司光岳系列人才计划,英国365集团公司优秀学位论文指导教师,主持或参与国家自然科学基金及山东省自然科学基金多项,研究领域为反应扩散微分方程、延迟微分方程及脉冲微分方程的数值分析,在Applied Numerical Mathematics、Journal of Computational and Applied Mathematics、Computers & Mathematics with Applications等TOP期刊发表SCI论文二十余篇。
教研、科研项目
1. 脉冲延迟微分方程数值方法的稳定性研究(山东省自然科学基金)
2. 几类非线性强不定型微分方程解的存在性和多重性研究(山东省自然科学基金)
3. 保法向双曲曲率流及其应用(山东省自然科学基金)
4. 非线性数学物理方程非局域对称、可积离散化的研究(国家自然科学基金)
论文发表情况
[1]X. Liu, J. Wang, Y.H., Lang and Z.X. Zhou, A positivity-preserving Galerkin finite element scheme for a nonlinear reaction-diffusion-advection Mussel-Algal model with Danckwerts boundary conditions. Journal of Applied Mathematics and Computing, 72, 110, 2026. (SCI收录,TOP期刊,JCR1区)
[2]Li, W., Liu, X., Lang, Y., & Yang, H. Numerical analysis of a second-order method for a nonlinear diffusive SIR epidemic model with a saturated incidence rate in a heterogeneous environment. International Journal of Computer Mathematics, 1–29, 2026. (SCI收录,JCR2区)
[3]Wang, Q., Liu, X., & Wu, K. N. Projective synchronisation of reaction-diffusion networks via boundary control. International Journal of Systems Science, 1–15,2026.(SCI收录,JCR1区)
[4]Lang, Y., Liu, X., Li, W. et al. Threshold stability analysis of an unconditionally positivity-preserving method for a nonlinear reaction-diffusion-advection algae-mussel model under Danckwerts boundary conditions. Numer Algor (2025).(SCI收录,JCR1区)
[5]Zhang, M., Liu, X. & Yang, S. Threshold stability analysis of an unconditionally positivity-preserving numerical method for a nonlinear age-structured diffusive HIV model with spatial coefficients. Z. Angew. Math. Phys. 76, 31 (2025). (SCI收录,JCR2区)
[6]W. Guo, T. Chang, W. Li and X. Liu, "Synchronization for Coupled Stochastic Nonlinear Systems With Time-Varying and Non-Strongly Connected Structure," in IEEE Transactions on Automation Science and Engineering, vol. 22, pp. 9559-9570, 2025, (SCI收录,TOP期刊,JCR1区).
[7]Li WL, Xing Liu and Lang YH, Numerical analysis of a nonlinear age-structured HBV model with saturated incidence and spatial diffusion, Mathematics and Computers in Simulation, Vol. 225: 250-266, 2024. (SCI收录,TOP期刊,JCR1区)
[8]Yang SY, Liu, X. Numerical threshold stability analysis of a positivity-preserving IMEX numerical scheme for a nonlinear age-space structured SIR epidemic model. Computational and Applied Mathematics, 43, 240 (2024). (SCI收录,JCR1区)
[9]X. Liu, M. Zhang, Z.W. Yang, Numerical threshold stability of a nonlinear age-structured reaction diffusion heroin transmission model, Applied Numerical Mathematics,Volume 204, 291-311(2024)(SCI收录,JCR1区)
[10]Liu, X., S. Y. Yang, and Z. W. Yang. Numerical threshold stability of an unconditionally positivity-preserving numerical method for a nonlinear age-structured reaction–diffusion brucellosis model. International Journal of Biomathematics (2024): 2450082.(SCI收录,JCR2区)
[11]Liu X, Yang ZW and Zeng YM, Global numerical analysis of an improved IMEX numerical scheme for a reaction diffusion SIS model in advective heterogeneous environments, Computers & Mathematics with Applications, Vol.144, 264-273, 2023.(SCI收录,JCR1区)
[12]Liu X, Yang ZW and Zeng YM , Long-time numerical properties analysis of a diffusive SIS epidemic model under a linear external source, International Journal of Computer Mathematics, Vol.100, No.8, 1737-1756, 2023. (SCI收录,JCR2区)
[13]Yang SY, Liu X and Zhang M, Threshold stability of an improved IMEX numerical method based on conservation law for a nonlinear advection–diffusion Lotka–Volterra model, Mathematics and Computers in Simulation, Vol. 213, 127-144, 2023. (SCI收录,TOP期刊,JCR1区)
[14]Liu X and Yang ZW, Numerical analysis of a reaction diffusion susceptible infected susceptible epidemic model, Computational and Applied Mathematics, Vol.41, No.392, 2022. (SCI收录,JCR1区)
[15]X. Liu, Y.M. Zeng, Analytic and numerical stability of delay differential equations with variable impulses, Applied Mathematics and Computation, Volume 358, Pages 293-304,2019.(SCI收录,TOP期刊JCR1区)
[16]Liu X. and Zeng Y.M., Linear multistep methods for impulsive delay differential equations, Applied Mathematics and Computation, Vol. 321, 555-563, 2018.(SCI收录,TOP期刊,JCR1区)
[17]Liu X. and Zeng Y.M., Stability Analysis of Analytical and Numerical Solutions to Nonlinear Delay Differential Equations with Variable Impulses, Discrete Dynamics in Nature and Society, Vol.2017, 6723491, 2017.(SCI收录,JCR2区)
[18]X. Liu, M.Z. Liu, Asymptotic stability of Runge–Kutta methods for nonlinear differential equations with piecewise continuous arguments, Journal of Computational and Applied Mathematics, Volume 280, Pages 265-274,2015.(SCI收录,JCR1区)
[19]Liu X., Zhang G.L. and Liu M.Z., Exponential asymptotic stability of nonlinear impulsive differential equations, Applied Numerical Mathematics, Vol.81,40-49, 2014.(SCI收录,JCR1区)
[20]Liu, Xing & Song, Minghui & Liu, M.. (2012). Linear Multistep Methods for Impulsive Differential Equations. Discrete Dynamics in Nature and Society. 2012. 10.1155/2012/652928. (SCI收录,JCR2区)
[21]M.H. Song, X. Liu, The improved linear multistep methods for differential equations with piecewise continuous arguments, Applied Mathematics and Computation, Volume 217, Issue 8, Pages 4002-4009,2010.(SCI收录,TOP期刊,JCR1区)
联系邮箱:liuxing@lcu.edu.cn
