Analysis and implementation of robust numerical methods to solve mathematical models of HIV and Malaria co-infection

dc.contributor.authorElsheikh, Sara Mohamed Ahmed Suleiman
dc.date.accessioned2026-06-18T13:22:19Z
dc.date.available2026-06-18T13:22:19Z
dc.date.issued2011
dc.description.abstractThere is a growing interest in the dynamics of the co-infection of these two diseases. In this thesis, firstly we focus on studying the effect of a distributed delay representing the incubation period for the malaria parasite in the mosquito vector to possibly reduce the initial transmission and prevalence of malaria. This model can be regarded as a generalization of SEI models (with a class for the latently infected mosquitoes) and SI models with a discrete delay for the incubation period in mosquitoes. We study the possibility of occurrence of backward bifurcation. We then extend these ideas to study a full model of HIV and malaria co-infection. To get further inside into the dynamics of the model, we use the geometric singular perturbation theory to couple the fast and slow models from the full model. Finally, since the governing models are very complex, they cannot be solved analytically and hence we develop and analyze a special class of numerical methods to solve them.
dc.identifier.urihttps://hdl.handle.net/10566/24571
dc.language.isoen
dc.publisherUniversity of the Western Cape
dc.subjectHuman Immunodeficiency Virus (HIV)
dc.subjectMalaria
dc.subjectHIV-Malaria Co-infection
dc.subjectDistributed Delay
dc.subjectDynamical Systems
dc.titleAnalysis and implementation of robust numerical methods to solve mathematical models of HIV and Malaria co-infection
dc.typeThesis

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