Liang Zhang, associate professor, College of Sciences, Northwest A&F University
Sex: Male
Nationality: Chinese
Address:No. 22 Xinong Road, YangLing, Shaanxi 712100, P. R. China,
Email: zhangl@nwsuaf.edu.cn
Education Background
Ÿ Dec., 2010 Doctor’s degree in Applied Mathematics, Sichuan University,Chengdu, P.R. China
Ÿ Aug., 2009- Aug., 2010 Joint Ph.D in Applied Mathematics, University of Louisville,Louisville, Kentucky, U.S.A.
Ÿ Jun., 2007 M.S. in Applied Mathematics, Lanzhou University of Technology, Lanzhou, P.R. China
Ÿ Jun., 2004 B.S. in Mathematics, Qufu Normal University, Qufu, P.R. China
Employment Experience
Ÿ 2016-present Associate Professor, January, , College of Science, Northwest A&F University, Yangling, P.R. China
Ÿ Jun., 2019-Jul. , 2020 Visiting Scholar , Memorial University of Newfoundland, St. John’s, NL Canada
Ÿ Dec., 2011-Jun., 2014 Post-doctoral student in Plant Protection , Northwest A&F University, Yangling, P.R. China
Ÿ Mar., 2011-Dec., 2015 Lecture in College of Science, Northwest A&F University,Yangling, P.R. China
Research Interests
Ÿ Mathematical biology
Ÿ Dynamics of differential equations
Courses Offered
Ø For Undergraduate Students
Ÿ Probability Theory
Ÿ Probability Theory and Mathematical Statistics
Ÿ Advanced Mathematics
Ø For Graduate Students
Ÿ Functional Analysis
Ÿ Mathematical Modelling and Research of Population Ecology
Ÿ Mathematical Modelling of Population Ecology and Epidemiology
Research Achievements
(1) Research Projects
1) Presiding over two School-level Teaching Reform Programs
2)Participating in three School-level Teaching Reform Programs
(2)Published Papers
[1]Shitao Liu, Liang Zhang*. Dynamics of synthetic drug transmission models[J]. Inter national Journal of Nonlinear Sciences and Numerical Simulation , 2022, 23(3-4) :313-334
[2]Yifan Xing, Liang Zhang*&Xinghao Wang. Modelling and stability of epidemic model with free-living pathogens growing in the environment[J]. Journal of Applied Analysis and Computation , 2020, 10(1):55-70
[3]Liang Zhang*, Yifan Xing. Stability Analysis of a Reaction-Diffusion Heroin Epidemic Model. Complexity, Volume 2020, Article ID 3781425, 16 pages
[4]Liang zhang, Shitao Liu&Xiaobing Zhang, Asymptotic behavior of a stochastic virus dynamics model with intracellular delay and humoral immunitylJ]. Journal of Applied Analysis and Computation , 2019, 9(4):1425-1442
[5]Shitao Liu, Liang Zhang*, Xiao-Bing Zhang & Aibing Li. Dynamics of a stochastic heroin epidemic model with bilinear incidence and varying population size[J]. International Journal of Biomathematics , 2019, 12(1):1950005 (21 pages)
[6]Shitao Liu, Liang Zhang*&Yifan Xing. Dynamics of a stochastic heroin epidemic model[J]. Journal of Computational and Applied Mathematics , 2019 (351): 260-269
[7]Pengyan Liu, Liang Zhang* Yifan Xing, Modelling and stability of a synthetic drugs transmission model with relapse and treatment[J]. Journal of Applied Mathematics and Computing , 2019, (60):465-484
[8]L. Zhang* and Y. F. Xing. Extremal Solutions for Nonlinear First-Order Impulsive Integro-Differential Dynamic Equations[J]. Mathematical Notes , 2019,105(1): 123-131
[9]LiangZhang*, Pengyan Liu&Shitao Liu. Some remarks on traveling waves in a time-delayed population system with stage structure[J]. Applied Mathematics E-Notes , 2017 (17):85-90
[10]Pengyan Liu, LiangZhang*, Shitao Liu&Lifei Zheng. Global exponential stability of almost periodic solutions for Nicholson’s blowflies system with nonlinear density dependent mortality terms and patch structure[J]. Journal of Mathematical Modelling and A nalysis , 2017, 22(4):484-502
[11]Liang Zhang, Huiyan Zhao*.Traveling Wave Solutions in a Stage-Structured Delayed Reaction-Diffusion Model with Advection[J]. Journal of Mathematical Modelling and Analysis , 2015, 20(2):168 -187
[12]Liang Zhang*, Bingtuan Li. Traveling wave solutions in an integro-differential competition Model[J]. Discrete and Continuous Dynamics System Series-B , 2012, 17(1): 417-428
[13]Liang Zhang*, Bingtuan Li&Jin Shang. Stability and traveling wave solutions for a time-delayed populations system with stage structure[J]. Nonlinear Analysis: Real world and applications , 2012, (13):1429-1440
[14]Huiyan Zhao*, Liang Zhang, Mkdk Poyaratne, Zhen Li&Qingxiang Meng. Catastrophe model and its applications in insect ecology[J]. International Journal of Information and System Science , 2012 (8) :106-113
[15]Bingtuan Li, Liang Zhang*. Existence of traveling wave solutions in delayed cooperative Systems[J]. Nonlinearity , 2011 (24):1759-1776
[16]Liang Zhang, Yong Wang*, etal., Periodic solutions and global attraction for n-dimension discrete-time neural networks with time varying delays[J]. Bulletin of the Belgian mathematical society-Simon Stevin , 2011 (18) :483-491
[17]Yong Wang*, Liang Zhang. Existence of asymptotically stable periodic solutions of a Rayleigh type equation[J]. Nonlinear Analysis , 2009 (71) :1728-1735
[18]Liang Zhang*, Hong-Xu Li&Xiao-Bing Zhang. Periodic solutions of competition Lotka-Volterra dynamic system on time scales[J]. Computers and Mathematics with Applications , 2009 (57): 1204-1211
[19]Liang Zhang*, Hai-Feng Zhao. Periodic Solutions Of A Three-Species Food Chain Model[J]. Applied Mathematics E-Notes , 2009 (9): 47-54
[20]Ronghua He, Hong-Xu Li&Liang Zhang*. Two periodic solutions of predator-prey dynamic system on time scales[J]. Electron. J. Diff. Equ ., 2009 (126):1-9
[21]Liang Zhang, Hong-Xu Li*. Periodicity on a class of neutral impulsive delay system[J]. Applied Mathematics and Computation , 2008 (203): 178-185
[22]Liang Zhang, Hai-Feng Huo*, Li-Ming Miao&Sui Sun Cheng. Global Attraction in a Recursive Relation[J]. Applied Mathematics E-Notes , 2007 (7) :154-158
[23]Hai-Feng Huo*, Liang Zhang&Li-Ming Miao. Persistence and periodic solutions for predator-prey model[J]. Journal of Lanzhou University of Technology , 2007, 33 (5):132-135
[24]Liang Zhang, Hai-Feng Huo*, Li-Ming Miao&Hong Xiang. Dynamical behavior ff a third-order rational difference equation[J]. A pplied M athematics E-Notes , 2006(6): 268-275