Abstract
In this article, we propose a general predator-prey system where prey is subject to Allee effects and disease with the following unique features: (i) Allee effects built in the reproduction process of prey where infected prey (I-class) has no contribution; (ii) Consuming infected prey would contribute less or negatively to the growth rate of predator (P-class) in comparison to the consumption of susceptible prey (S-class). We provide basic dynamical properties for this general model and perform the detailed analysis on a concrete model (SIP-Allee Model) as well as its corresponding model in the absence of Allee effects (SIP-no-Allee Model); we obtain the complete dynamics of both models: (a) SIP-Allee Model may have only one attractor (extinction of all species), two attractors (bi-stability either induced by small values of reproduction number of both disease and predator or induced by competition exclusion), or three attractors (tri-stability); (b) SIP-no-Allee Model may have either one attractor (only S-class survives or the persistence of S and I-class or the persistence of S and P-class) or two attractors (bi-stability with the persistence of S and I-class or the persistence of S and P-class). One of the most interesting findings is that neither models can support the coexistence of all three S, I, P-class. This is caused by the assumption (ii), whose biological implications are that I and P-class are at exploitative competition for S-class whereas I-class cannot be superior and P-class cannot gain significantly from its consumption of I-class. In addition, the comparison study between the dynamics of SIP-Allee Model and SIP-no-Allee Model lead to the following conclusions: 1) In the presence of Allee effects, species are prone to extinction and initial condition plays an important role on the surviving of prey as well as its corresponding predator; 2) In the presence of Allee effects, disease may be able to save prey from the predation-driven extinction and leads to the coexistence of S and I-class while predator can not save the disease-driven extinction. All these findings may have potential applications in conservation biology.
Highlights
20 Eco-epidemiology is comparatively a new branch in mathematical biology which simultaneously con21 siders the ecological and epidemiological processes [5]
The rest of the paper is organized as follows: In Section 2, we provide the detailed formulation of a general prey-predator system with prey subject to Allee effects and disease; and we show the basic dynamical properties of such general model
In this subsection, we focus on the disease/predation-driven extinctions as well as the features of global dynamics of both submodels
Summary
20 Eco-epidemiology is comparatively a new branch in mathematical biology which simultaneously con siders the ecological and epidemiological processes [5]. Theorem 2.1 indicates that our general prey-predator model with Allee effects and disease in prey has a compact global attractor living in the set (S, I, P ) ∈ X : 0 ≤ S + I ≤ 1, 0 ≤ S + I + P ≤ max{0≤N≤1} rS(S − θ) (1 − N ) + min{μ, d} . 1 < b = R0P < 1.67, b < min According to Proposition 4.1, sufficient conditions for EPi and EIi being locally asymptotically stable in the SP -plane, SI-plane, respectively, but being unstable in R3+ are as follows: 1
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