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#1 2010-10-02 09:28:01
- ToastCrunch
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- Registered: 2010-10-02
- Posts: 1
Equilibrium Population Stability
How do I find if equilibrium populations are stable?
For example, dN/dt = aN(f-BN) / (1+agN)
That's Smith's model of population growth.
I know that the problem boils down to dN/dt and that I want to see whether when dN/dt=0 whether population tends to approach N near that time (stable) or not.
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#2 2010-10-02 10:56:40
- mathsyperson
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- Registered: 2005-06-22
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Re: Equilibrium Population Stability
A steady state is stable if d²N/dt² is negative for that value of N.
You can see why this is, because it means that for a value of N just less than a steady state, dN/dt would be positive (and so N would be increasing towards the steady state), and for an N just more than a steady state, dN/dt would be negative and so N would be decreasing towards the steady state.
Similarly, a steady state is definitely unstable if d²N/dt² is positive for that N.
If the second derivative is 0, then that test doesn't conclude anything.
Why did the vector cross the road?
It wanted to be normal.
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