Crossref Citations
This article has been cited by the following publications. This list is generated based on data provided by
Crossref.
Ainseba, B.
and
Iannelli, M.
2012.
Optimal Screening in Structured SIR Epidemics.
Mathematical Modelling of Natural Phenomena,
Vol. 7,
Issue. 3,
p.
12.
Agusto, Folashade B.
Del Valle, Sara Y.
Blayneh, Kbenesh W.
Ngonghala, Calistus N.
Goncalves, Maria J.
Li, Nianpeng
Zhao, Ruijun
and
Gong, Hongfei
2013.
The impact of bed-net use on malaria prevalence.
Journal of Theoretical Biology,
Vol. 320,
Issue. ,
p.
58.
Zhao, Ruijun
and
Mohammed-Awel, Jemal
2014.
A mathematical model studying mosquito-stage transmission-blocking vaccines.
Mathematical Biosciences and Engineering,
Vol. 11,
Issue. 5,
p.
1229.
Raja Sekhara Rao, P.
and
Naresh Kumar, M.
2015.
A dynamic model for infectious diseases: The role of vaccination and treatment.
Chaos, Solitons & Fractals,
Vol. 75,
Issue. ,
p.
34.
Iboi, E.
and
Okuonghae, D.
2016.
Population dynamics of a mathematical model for syphilis.
Applied Mathematical Modelling,
Vol. 40,
Issue. 5-6,
p.
3573.
Ngonghala, Calistus N.
Teboh-Ewungkem, Miranda I.
and
Ngwa, Gideon A.
2016.
Observance of period-doubling bifurcation and chaos in an autonomous ODE model for malaria with vector demography.
Theoretical Ecology,
Vol. 9,
Issue. 3,
p.
337.
Saad-Roy, C.M.
Shuai, Zhisheng
and
van den Driessche, P.
2016.
A mathematical model of syphilis transmission in an MSM population.
Mathematical Biosciences,
Vol. 277,
Issue. ,
p.
59.
Verelst, Frederik
Willem, Lander
and
Beutels, Philippe
2016.
Behavioural change models for infectious disease transmission: a systematic review (2010–2015).
Journal of The Royal Society Interface,
Vol. 13,
Issue. 125,
p.
20160820.
Gerberry, David J.
2016.
Practical aspects of backward bifurcation in a mathematical model for tuberculosis.
Journal of Theoretical Biology,
Vol. 388,
Issue. ,
p.
15.
B. Gumel, Abba
M.‐S. Lubuma, Jean
Sharomi, Oluwaseun
and
Terefe, Yibeltal Adane
2018.
Mathematics of a sex‐structured model for syphilis transmission dynamics.
Mathematical Methods in the Applied Sciences,
Vol. 41,
Issue. 18,
p.
8488.
Nwankwo, A.
and
Okuonghae, D.
2018.
Mathematical Analysis of the Transmission Dynamics of HIV Syphilis Co-infection in the Presence of Treatment for Syphilis.
Bulletin of Mathematical Biology,
Vol. 80,
Issue. 3,
p.
437.
Okuonghae, D.
Gumel, A. B.
Ikhimwin, B. O.
and
Iboi, E.
2019.
Mathematical Assessment of the Role of Early Latent Infections and Targeted Control Strategies on Syphilis Transmission Dynamics.
Acta Biotheoretica,
Vol. 67,
Issue. 1,
p.
47.
Echigoya, Yuri
Yamaguchi, Takayuki
Imamura, Akifumi
and
Nishiura, Hiroshi
2020.
Estimating the syphilis incidence and diagnosis rate in Japan: a mathematical modelling study.
Sexually Transmitted Infections,
Vol. 96,
Issue. 7,
p.
516.
Jing, Wenjun
Ma, Ning
Liu, Weichen
and
Zhao, Yu
2021.
The effect of public health awareness and behaviors on the transmission dynamics of syphilis in Northwest China, 2006–2018, based on a multiple-stages mathematical model.
Infectious Disease Modelling,
Vol. 6,
Issue. ,
p.
1092.
Zhou, Yaxin
Zuo, Wenjie
Jiang, Daqing
and
Song, Mingyu
2021.
Stationary distribution and extinction of a stochastic model of syphilis transmission in an MSM population with telegraph noises.
Journal of Applied Mathematics and Computing,
Vol. 66,
Issue. 1-2,
p.
645.
Omame, A.
Okuonghae, D.
Nwafor, U. E.
and
Odionyenma, B. U.
2021.
A co-infection model for HPV and syphilis with optimal control and cost-effectiveness analysis.
International Journal of Biomathematics,
Vol. 14,
Issue. 07,
Bonyah, E.
Chukwu, C. W.
Juga, M. L.
and
Fatmawati
2021.
Modeling fractional-order dynamics of Syphilis via Mittag-Leffler law.
AIMS Mathematics,
Vol. 6,
Issue. 8,
p.
8367.
Momoh, Abdulfatai Atte
Bala, Yusuf
Washachi, Dekera Jacob
and
Déthié, Dione
2021.
Mathematical analysis and optimal control interventions for sex structured syphilis model with three stages of infection and loss of immunity.
Advances in Difference Equations,
Vol. 2021,
Issue. 1,
Tchoumi, S.Y.
Dongmo, E.Z.
Kamgang, J.C.
and
Tchuenche, J.M.
2022.
Dynamics of a two-group structured malaria transmission model.
Informatics in Medicine Unlocked,
Vol. 29,
Issue. ,
p.
100897.
Nwajeri, U.K.
Panle, A.B.
Omame, A.
Obi, Martin C.
and
Onyenegecha, C.P.
2022.
On the fractional order model for HPV and Syphilis using non–singular kernel.
Results in Physics,
Vol. 37,
Issue. ,
p.
105463.