Vaccination and combined optimal control measures for malaria prevention and spread mitigation

Abstract

Malaria is a life-threatening mosquito-borne infectious disease prevalent in tropical regions, primarily transmitted to humans by the bites of infected Anopheles mosquitoes. This study presents a mathematical model analysis aimed at understanding the dynamics of malaria transmission and the effectiveness of various prevention strategies. Despite being preventable and curable, malaria continues to pose significant public health challenges, notably due to the risk of recurrent infections if improperly treated. The proposed deterministic model establishes the positivity and boundedness of solutions alongside the local stability of equilibria. A sensitivity analysis is conducted to identify key parameters impacting the basic reproduction number (R0), which is crucial for evaluating intervention strategies. The findings indicate that although the current vaccines are not 100% effective, vaccination could significantly contribute to malaria control alongside existing preventive measures, such as mosquito nets and insecticide spraying. The study underscores the need for a comprehensive approach combining multiple strategies to effectively reduce malaria transmission and improve health outcomes in endemic regions. Overall, this research highlights the importance of mathematical modeling in formulating effective disease control policies.