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The Ross-Macdonald model in a patchy environment |
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| Authors: | Auger Pierre Kouokam Etienne Sallet Gauthier Tchuente Maurice Tsanou Berge |
| Affiliation: | a IRD, UR GEODES, 32 Avenue Henri Varagnat, 3143 Bondy Cedex, France b INRIA-Lorraine and University Paul Verlaine-Metz, LMAM-CNRS UMR 7122, ISGMP Bat. A, Ile du Saulcy, 57045 Metz Cedex 01, France c MAT Laboratory, Faculty of Science, University of Yaoundé I, P.O. Box 812 Yaoundé, Cameroon d Department of Mathematics, University of Dschang, Cameroon |
| Abstract: | We generalize to n patches the Ross-Macdonald model which describes the dynamics of malaria. We incorporate in our model the fact that some patches can be vector free. We assume that the hosts can migrate between patches, but not the vectors. The susceptible and infectious individuals have the same dispersal rate. We compute the basic reproduction ratio R(0). We prove that if R(0)1, then the disease-free equilibrium is globally asymptotically stable. When R(0)>1, we prove that there exists a unique endemic equilibrium, which is globally asymptotically stable on the biological domain minus the disease-free equilibrium. |
| Keywords: | Metapopulation models Vector-borne diseases Ross-Macdonald model Nonlinear dynamical systems Global stability Monotone systems |
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