Abstract
We investigate the global asymptotic behavior of solutions of the system of difference equations x n+1= x n a+cy n , y n+1= y n b+dx n , n=0,1,…, where the parameters a and b are in (0,1), c and d are arbitrary positive numbers and the initial conditions x 0 and y 0 are arbitrary nonnegative numbers. We show that the stable manifold of this system separates the positive quadrant into basins of attraction of two types of asymptotic behavior. In the case where a= b we find an explicit equation for the stable manifold.
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