Ruijun Zhao, Ph.D.
Affiliations: | 2008 | Mathematics | Purdue University, West Lafayette, IN, United States |
Area:
MathematicsGoogle:
"Ruijun Zhao"Parents
Sign in to add mentor| Fabio A. Milner | grad student | 2008 | Purdue | |
| (Some mathematical models and scientific computations in epidemiology and immunology.) | ||||
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Publications
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| Zhao R, Zhang Y, Chen S. (2017) Krylov implicit integration factor WENO method for SIR model with directed diffusion Discrete and Continuous Dynamical Systems-Series B. 24: 4983 |
| Mohammed-Awel J, Zhao R, Numfor E, et al. (2017) Management strategies in a malaria model combining human and transmission-blocking vaccines Discrete and Continuous Dynamical Systems-Series B. 22: 977-1000 |
| Ngonghala CN, Mohammed-Awel J, Zhao R, et al. (2016) Interplay between insecticide-treated bed-nets and mosquito demography: implications for malaria control. Journal of Theoretical Biology |
| Zhao R, Mohammed-Awel J. (2014) A mathematical model studying mosquito-stage transmission-blocking vaccines. Mathematical Biosciences and Engineering : Mbe. 11: 1229-45 |
| Ngonghala CN, Del Valle SY, Zhao R, et al. (2014) Quantifying the impact of decay in bed-net efficacy on malaria transmission. Journal of Theoretical Biology. 363: 247-61 |
| Agusto FB, Del Valle SY, Blayneh KW, et al. (2013) The impact of bed-net use on malaria prevalence. Journal of Theoretical Biology. 320: 58-65 |
| Milner FA, Zhao R. (2010) A new mathematical model of syphilis Mathematical Modelling of Natural Phenomena. 5: 96-108 |
| Zhao R, Milner FA. (2008) A Mathematical model of Schistosoma mansoni in Biomphalaria glabrata with control strategies. Bulletin of Mathematical Biology. 70: 1886-905 |
| Milner FA, Zhao R. (2008) A deterministic model of schistosomiasis with spatial structure. Mathematical Biosciences and Engineering : Mbe. 5: 505-22 |
| Milner FA, Zhao R. (2008) S-I-R model with directed spatial diffusion Mathematical Population Studies. 15: 160-181 |