Frontiers in Applied Mathematics and Statistics (Apr 2024)

Mathematical modelling of non-pharmaceutical interventions to control infectious diseases: application to COVID-19 in Kenya

  • Wandera Ogana,
  • Wandera Ogana,
  • Victor Ogesa Juma,
  • Victor Ogesa Juma,
  • Wallace D. Bulimo

DOI
https://doi.org/10.3389/fams.2024.1365184
Journal volume & issue
Vol. 10

Abstract

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IntroductionThe first case of COVID-19 in Kenya was reported on March 13, 2020, prompting the collection of baseline data during the initial spread of the disease. Subsequently, the Kenyan government implemented non-pharmaceutical interventions (NPIs) on April 9, 2020, to mitigate disease transmission over a two-month period. These measures were later gradually relaxed starting from June 9, 2020.MethodsWe applied a deterministic mathematical model to simulate the dynamics of COVID-19 transmission in Kenya. Using baseline data, we estimated transmission and recovery rates and proposed a mathematical model of how NPIs affect disease transmission rates. The model extends to interventions that yield an increase in disease transmission, unlike previous models that were limited to a decrease in transmission. We computed the mitigation and relaxation fractions and hence deduced the impact of the interventions.ResultsThe mitigation measures imposed from April 9, 2020, reduced the disease transmission by 43.7% from the baseline level, while the relaxation from June 9, 2020, increased the transmission by 32% over the mitigation level. Without intervention, the model predicts that infections would have peaked at 30% by late May 2020. However, due to the combined effect of mitigation and relaxation, the epidemic peaked at 13% infection in mid-July 2020.DiscussionThe model’s projections closely align with observed data, providing valuable insights for planning. Ongoing research aims to refine the model to capture sub-waves and spikes, as well as simulate multiple waves of infection. These efforts will enhance our understanding of COVID-19 dynamics and inform effective public health strategies. The estimated basic reproduction number R0=2.76, consistent with previous findings, underscores the validity of our model and its relevance in predicting disease transmission dynamics.

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