On an impulsive faecal-oral model in a moving infected environment
Abstract
This paper develops an impulsive faecal-oral model with free boundary to in order to understand how the exposure to a periodic disinfection and expansion of the infected region together influences the spread of faecal-oral diseases. We first check that this impulsive model has a unique globally nonnegative classical solution. The principal eigenvalues of the corresponding periodic eigenvalue problem at the initial position and infinity are defined as λ1(h0) and λ1(∞), respectively. They both depend on the impulse intensity 1-G'(0) and expansion capacities μ1 and μ2. The possible long time dynamical behaviours of the model are next explored in terms of λ1(h0) and λ1(∞): if λ1(∞)≥ 0, then the diseases are vanishing; if λ1(∞)<0 and λ1(h0)≤ 0, then the disease are spreading; if λ1(∞)<0 and λ1(h0)> 0, then for any given μ1, there exists a μ0 such that spreading happens as μ2∈( μ0,+∞), and vanishing happens as μ2∈(0, μ0). Finally, numerical examples are presented to corroborate the correctness of the obtained theoretical findings and to further understand the influence of an impulsive intervention and expansion capacity on the spreading of the diseases. Our results show that both the increase of impulse intensity and the decrease of expansion capacity have a positive contribution to the prevention and control of the diseases.
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