Threshold and stability results for a malaria model in a population with protective intervention among high‐risk groups
We develop a mathematical model for the dynamics of malaria with a varying population for which new individuals are recruited through immigration and births. In the model, we assume that non‐immune travellers move to endemic regions with sprays, smear themselves with jelly that is repellent to mosq...
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Vilnius Gediminas Technical University
2008-09-01
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| Series: | Mathematical Modelling and Analysis |
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| Online Access: | https://journals.vgtu.lt/index.php/MMA/article/view/7030 |
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doaj-e7f1b7f06009456ca2f2acee35b8e8182021-07-02T10:49:54ZengVilnius Gediminas Technical UniversityMathematical Modelling and Analysis1392-62921648-35102008-09-0113310.3846/1392-6292.2008.13.443-460Threshold and stability results for a malaria model in a population with protective intervention among high‐risk groupsJulius Tumwiine0Joseph Y.T. Mugisha1Livingstone S. Luboobi2Department of Mathematics, Mbarara University of Science and Technology, P.O.Box 1410, Mbarara, UgandaDepartment of Mathematics, Makerere University, P.O.Box 7062, Kampala, UgandaDepartment of Mathematics, Makerere University, P.O.Box 7062, Kampala, Uganda We develop a mathematical model for the dynamics of malaria with a varying population for which new individuals are recruited through immigration and births. In the model, we assume that non‐immune travellers move to endemic regions with sprays, smear themselves with jelly that is repellent to mosquitoes on arrival in malarious regions, others take long term antimalarials, and pregnant women and infants receive full treatment doses at intervals even when they are not sick from malaria (commonly referred to as intermittent preventive therapy). We introduce more features that describe the dynamics of the disease for the control strategies that protect the above vulnerable groups. The model analysis is done and equilibrium points are analyzed to establish their local and global stability. The threshold of the disease, the control reproduction number, is established for which the disease can be eliminated. First Published Online: 14 Oct 2010 https://journals.vgtu.lt/index.php/MMA/article/view/7030Protective interventionThreshold parameterControl reproduction numberrisk groups |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Julius Tumwiine Joseph Y.T. Mugisha Livingstone S. Luboobi |
| spellingShingle |
Julius Tumwiine Joseph Y.T. Mugisha Livingstone S. Luboobi Threshold and stability results for a malaria model in a population with protective intervention among high‐risk groups Mathematical Modelling and Analysis Protective intervention Threshold parameter Control reproduction number risk groups |
| author_facet |
Julius Tumwiine Joseph Y.T. Mugisha Livingstone S. Luboobi |
| author_sort |
Julius Tumwiine |
| title |
Threshold and stability results for a malaria model in a population with protective intervention among high‐risk groups |
| title_short |
Threshold and stability results for a malaria model in a population with protective intervention among high‐risk groups |
| title_full |
Threshold and stability results for a malaria model in a population with protective intervention among high‐risk groups |
| title_fullStr |
Threshold and stability results for a malaria model in a population with protective intervention among high‐risk groups |
| title_full_unstemmed |
Threshold and stability results for a malaria model in a population with protective intervention among high‐risk groups |
| title_sort |
threshold and stability results for a malaria model in a population with protective intervention among high‐risk groups |
| publisher |
Vilnius Gediminas Technical University |
| series |
Mathematical Modelling and Analysis |
| issn |
1392-6292 1648-3510 |
| publishDate |
2008-09-01 |
| description |
We develop a mathematical model for the dynamics of malaria with a varying population for which new individuals are recruited through immigration and births. In the model, we assume that non‐immune travellers move to endemic regions with sprays, smear themselves with jelly that is repellent to mosquitoes on arrival in malarious regions, others take long term antimalarials, and pregnant women and infants receive full treatment doses at intervals even when they are not sick from malaria (commonly referred to as intermittent preventive therapy). We introduce more features that describe the dynamics of the disease for the control strategies that protect the above vulnerable groups. The model analysis is done and equilibrium points are analyzed to establish their local and global stability. The threshold of the disease, the control reproduction number, is established for which the disease can be eliminated.
First Published Online: 14 Oct 2010
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| topic |
Protective intervention Threshold parameter Control reproduction number risk groups |
| url |
https://journals.vgtu.lt/index.php/MMA/article/view/7030 |
| work_keys_str_mv |
AT juliustumwiine thresholdandstabilityresultsforamalariamodelinapopulationwithprotectiveinterventionamonghighriskgroups AT josephytmugisha thresholdandstabilityresultsforamalariamodelinapopulationwithprotectiveinterventionamonghighriskgroups AT livingstonesluboobi thresholdandstabilityresultsforamalariamodelinapopulationwithprotectiveinterventionamonghighriskgroups |
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