Analysis of Control Measures for Vector-borne Diseases Using a Multistage Vector Model with Multi-Host Sub-populations

Abstract

We propose and analyze an epidemiological model for vector borne diseases that integrates a multi-stage vector population and several host sub-populations which may be characterized by a variety of compartmental model types: subpopulations all include Susceptible and Infected compartments, but may or may not include Exposed and/or Recovered compartments. The model was originally designed to evaluate the effectiveness of various prophylactic measures in malaria-endemic areas, but can be applied as well to other vector-borne diseases. This model is expressed as a system of several differential equations, where the number of equations depends on the particular assumptions of the model. We compute the basic reproduction number R0, and show that if R0≤slant 1, the disease free equilibrium (DFE) is globally asymptotically stable (GAS) on the nonnegative orthant. If R0>1, the system admits a unique endemic equilibrium (EE) that is GAS. We analyze the sensitivity of R0 and the EE to different system parameters, and based on this analysis we discuss the relative effectiveness of different control measures.