Wang Fu-jun. Stability Analysis for Two Kinds of Equations in Two-Species Population Dynamics[J]. Applied Mathematics and Mechanics, 1991, 12(10): 951-955.
Citation:
Wang Fu-jun. Stability Analysis for Two Kinds of Equations in Two-Species Population Dynamics[J]. Applied Mathematics and Mechanics, 1991, 12(10): 951-955.
Wang Fu-jun. Stability Analysis for Two Kinds of Equations in Two-Species Population Dynamics[J]. Applied Mathematics and Mechanics, 1991, 12(10): 951-955.
Citation:
Wang Fu-jun. Stability Analysis for Two Kinds of Equations in Two-Species Population Dynamics[J]. Applied Mathematics and Mechanics, 1991, 12(10): 951-955.
In this paper we study the stability for equilibrium points of equations in two-population dynamics. We discuss two predator-prey-patch models. Model 1 is described by a differential equation. Model 2 is described by an integral differential equation. We obtain the conditions for the stability of their equilibrium points. The results show that the overall population stability despite local extinction is realizable.
Wang Fu-jun. Stability Analysis for Two Kinds of Equations in Two-Species Population Dynamics[J]. Applied Mathematics and Mechanics, 1991, 12(10): 951-955.
Wang Fu-jun. Stability Analysis for Two Kinds of Equations in Two-Species Population Dynamics[J]. Applied Mathematics and Mechanics, 1991, 12(10): 951-955.