Critical points for system of 3 first order differential equations

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spcrooks
spcrooks 2018 年 12 月 2 日
コメント済み: spcrooks 2018 年 12 月 8 日
Hi all,
I am trying to solve a system of non-linear ODE's for the critical points. I then need to determine the stability of the points.
My system is as follows:
u'1 = u1 + 4*u2 - u1*u2
u2' = 9*u1 + 4*u2 - u2*u3
u3' = 2*u1^2 + 9*u2^2 -89
It was recommended to me to try Newton's method to find the critical points...but I am unsure how to do so for 3 equations.
The methods that I have learned up until this point won't work, considering the unknowns. I'm not asking for a solution...simply a nudge in the right direction.
Thank you

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John D'Errico
John D'Errico 2018 年 12 月 2 日
編集済み: John D'Errico 2018 年 12 月 2 日
What would you define a critical point to be? Perhaps one where u'1=u'2=u'3=0?
How would you identify that set of points? Perhaps as solutions to the corresponding nonlinear system? It would seem the derivatives go away there. ;-)
Can Newton's method be applied to such a problem? Hint: do some reading about Newton-Raphson.
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spcrooks
spcrooks 2018 年 12 月 8 日
Thanks, John. Fair enough...no the system won't pass through a point with a non-zero imaginary comp. In that case the critical points are apparent.
Ok...so now if I want to determine the stability of these points...I determine the Jacobian matrix:
>> syms u1 u2 u3
jacobian([u1 + 4*u2 - u1*u2, 9*u1 + 4*u2 - u2*u3, 2*u1^2 + 9*u2^2 -89], [u1, u2, u3])
ans =
[ 1 - u2, 4 - u1, 0]
[ 9, 4 - u3, -u2]
[ 4*u1, 18*u2, 0]
[ 0, 0, 0]
So now all I would need to do is figure out the code for evaluating it at my critical points?
spcrooks
spcrooks 2018 年 12 月 8 日
Thanks for all your help, John. I appreciate it.
Sean

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