
Mathematical Biosciences and Engineering, 2018, 15(4): 10331054. doi: 10.3934/mbe.2018046
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Role of whitetailed deer in geographic spread of the blacklegged tick Ixodes scapularis : Analysis of a spatially nonlocal model
1. Department of Mathematics, University of Surrey, Guildford, Surrey GU2 7XH, UK
2. Institute for Mathematical Sciences, Renmin University of China, Beijing, China
3. Department of Mathematics, College of William and Mary, Williamsburg, VA, USA
4. Key Laboratory of Ecoenvironments in Three Gorges Reservoir Region, and School of Mathematics and Statistics, Southwest University, Chongqing, China
5. Department of Mathematical Sciences, University of Cincinnati, Cincinnati, OH, USA
6. Department of Applied Mathematics, University of Western Ontario, London, ON, Canada
Received: , Accepted: , Published:
Lyme disease is transmitted via blacklegged ticks, the spatial spread of which is believed to be primarily via transport on whitetailed deer. In this paper, we develop a mathematical model to describe the spatial spread of blacklegged ticks due to deer dispersal. The model turns out to be a system of differential equations with a spatially nonlocal term accounting for the phenomenon that a questing female adult tick that attaches to a deer at one location may later drop to the ground, fully fed, at another location having been transported by the deer. We first justify the wellposedness of the model and analyze the stability of its steady states. We then explore the existence of traveling wave fronts connecting the extinction equilibrium with the positive equilibrium for the system. We derive an algebraic equation that determines a critical value $c^*$ which is at least a lower bound for the wave speed in the sense that, if $c < c^*$, there is no traveling wave front of speed $c$ connecting the extinction steady state to the positive steady state. Numerical simulations of the wave equations suggest that $c^*$ is the minimum wave speed. We also carry out some numerical simulations for the original spatial model system and the results seem to confirm that the actual spread rate of the tick population coincides with $c^*$. We also explore the dependence of $c^*$ on the dispersion rate of the white tailed deer, by which one may evaluate the role of the deer's dispersion in the geographical spread of the ticks.
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