Basins of Attraction for Two-Species Competitive Model with Quadratic Terms and the Singular Allee Effect

Basins of Attraction for Two-Species Competitive Model with Quadratic Terms and the Singular Allee Effect

We consider the following system of difference equations: xn+1=xn2/B1xn2+C1yn2, yn+1=yn2/A2+B2xn2+C2yn2, n=0, 1, …, where B1, C1, A2, B2, C2 are positive constants and x0, y0≥0 are initial conditions. This system has interesting dynamics and it can have up to seven equilibrium points as well as a si...

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Veröffentlicht in:Discrete Dynamics in Nature and Society 2015-01, Vol.2015 (2015), p.73-88-308
Hauptverfasser: Brett, A., Kulenovic, Mustafa R. S.
Format: Artikel
Sprache:eng
Schlagworte:
Allee effect
Attraction
Basins
Biological research
Biology, Experimental
Competition
Constants
Difference equations
Dynamical systems
Dynamics
Economic models
Equilibrium
Initial conditions
Mathematical research
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Zusammenfassung:We consider the following system of difference equations: xn+1=xn2/B1xn2+C1yn2, yn+1=yn2/A2+B2xn2+C2yn2, n=0, 1, …, where B1, C1, A2, B2, C2 are positive constants and x0, y0≥0 are initial conditions. This system has interesting dynamics and it can have up to seven equilibrium points as well as a singular point at (0,0), which always possesses a basin of attraction. We characterize the basins of attractions of all equilibrium points as well as the singular point at (0,0) and thus describe the global dynamics of this system. Since the singular point at (0,0) always possesses a basin of attraction this system exhibits Allee’s effect.
ISSN:1026-0226
1607-887X
DOI:10.1155/2015/847360