张学兵 - 南京信息工程大学

个人简介

教育经历 2013.4–2017.4, 南京航空航天大学, 应用数学, 博士 2003.9–2006.6, 江苏大学, 应用数学, 硕士 1998.9 - 2002.6, 南京师范大学，数学与应用数学专业，本科生工作经历 2018.1-至今, 南京信息工程大学, 数学与统计学院, 副教授

研究领域

生物数学；非线性系统建模与分析

近期论文

查看导师最新文章（温馨提示：请注意重名现象，建议点开原文通过作者单位确认）

[1] Xuebing Zhang, Honglan Zhu. Dynamics and pattern formation in homogeneous diffusive predator–prey systems with predator interference or foraging facilitation, Nonlinear Analysis: Real World Applications, 2019, 48: 267-287. [2] Xuebing Zhang, Hongyong Zhao, Zhaosheng Feng, Spatio-temporal complexity of a delayed diffusive model for plant invasion, Computers & Mathematics with Applications, in press. DOI: 10.1016/j.camwa.2018.08.063 [3] Xuebing Zhang, Honglan Zhu, Hopf bifurcation and chaos of a delayed finance system, Complexity, 2018, in press. [4] Xuebing Zhang, Hongyong Zhao, Dynamics and pattern formation of a diffusivepredator–prey model in the presence of toxicity, Nonlinear Dynamics, 2018, Doi:https://doi.org/10.1007/s11071-018-4683-2 [5] Xuebing Zhang，Hongyong Zhao，Bifurcation and optimal harvesting of a diffusive predator–prey system with delays and interval biological parameters，Journal of Theoretical Biology，2014，363：390-403. [6] Xuebing Zhang，Honglan Zhu，Hongxing Yao，Analysis and adaptive synchronization for a new chaotic system，Journal of Dynamical and Control Systems，2012，18（4）：467-477. [7] Xuebing Zhang，Honglan Zhu，Hongxing Yao，Analysis of a new three dimensional chaotic system，Nonlinear Dynamics，2012，67（1）：335-343. [8] Zhang X, Zhao H. Stability and bifurcation of a reaction–diffusion predator–prey model with non-local delay and Michaelis–Menten-type prey harvesting. International Journal of Computer Mathematics, 2016, 93(9): 1447-1469. [9] Zhang X, Zhao H. Harvest control for a delayed stage-structured diffusive predator–prey model. International Journal of Biomathematics, 2017, 10(01): 1750004. [10] Xuebing Zhang, Hongyong Zhao. Dynamics analysis of a delayed diffusive predator–prey system with non-smooth continuous threshold harvesting. Computers \& Mathematics with Applications, 2016, 72(5): 1402-1417. [11] Xuebing Zhang, Hongyong Zhao, Dynamics analysis of a delayed reaction-diffusion predator-prey system with non-continuous threshold harvesting, Mathematical Biosciences,2017, 289, :130-141. [12] Zhao H, Zhang X, Huang X. Hopf bifurcation and spatial patterns of a delayed biological economic system with diffusion. Applied Mathematics & Computation, 2015, 266(C):462-480. [13] Liu J, Zhang X. Hopf bifurcation of a delayed diffusive predator-prey model with strong Allee effect. Advances in Difference Equations, 2017, 2017(1): 200. [14] Zhu H, Zhang X. Dynamics and Patterns of a Diffusive Prey-Predator System with a Group Defense for Prey. Discrete Dynamics in Nature and Society. 2018;2018. [15] Song P, Zhao H, Zhang X. Dynamic analysis of a fractional order delayed predator–prey system with harvesting. Theory in biosciences, 2016, 135(1-2):59-72. [16] Zhao H, Yuan J, Zhang X. Stability and bifurcation analysis of reaction–diffusion neural networks with delays. Neurocomputing. 2015 Jan 5;147:280-90. [17] Zhao H, Huang X, Zhang X. Hopf bifurcation and harvesting control of a bioeconomic plankton model with delay and diffusion terms. Physica A Statistical Mechanics & Its Applications, 2015, 421(52):300-315. [18] Zhao H, Huang X, Zhang X. Turing instability and pattern formation of neural networks with reaction–diffusion terms. Nonlinear Dynamics, 2014, 76(1):115-124.