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Let be a positive equilibrium of (2.1).
Theorem 4 Let N ∗ be a positive equilibrium point of (1) with respect to r.
Theorem 2 Let N ∗ be a positive equilibrium point of (1).
Theorem 5 Let N ∗ be a positive equilibrium point of (2) by the Allee effect at time t with respect to r ∗.
Similar(56)
That is, ( x ∗, y ∗ ) is a positive equilibrium of (1.3).
We say that a positive fuzzy number is a positive equilibrium for (1.6) if (2.10).
It is obvious that p is a positive equilibrium of ODE (15).
If condition (varepsilon r>bgamma) is satisfied, we can guarantee that ((x^,y^)^{mathrm{T}}) is a positive equilibrium.
Quadratic equation (5) has a positive solution u ∗ = − ( b + c − 1 ) + ( b + c − 1 ) 2 + 4 b 2. Then E ( u ∗, u ∗ ) is a positive equilibrium of model (3).
It is shown that when the basic reproduction number is less than 1 then the trivial equilibrium is globally asymptotically stable; if the basic reproduction number is greater than 1 then the trivial equilibrium is unstable and there is a positive equilibrium which attracts all positive solutions.
A positive fuzzy number x is called a positive equilibrium of (1) if x=A+frac{x}{x^{2}}.
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