I have the following ODE:
dx/dt = x^4 +4(x^3) - 60(x^2)
Generally the solutions x(t) satisfy x(0) = x[0].
I have found that the attactor is -10, the repellor is 6, and 0 is neither. However, I want to describe the asymptotic behaviour of the solution satisfying x(0) = 1/2, and this is where I get stuck. Advice?
Thank you.
dx/dt = x^4 +4(x^3) - 60(x^2)
Generally the solutions x(t) satisfy x(0) = x[0].
I have found that the attactor is -10, the repellor is 6, and 0 is neither. However, I want to describe the asymptotic behaviour of the solution satisfying x(0) = 1/2, and this is where I get stuck. Advice?
Thank you.