how to find equlibrium point of 5 non linear system with numerical method

8 次查看(过去 30 天)
Latifah
Latifah 2023-4-2
评论: Latifah 2023-4-2
I have a system of 5 non linear ordinary differential equations with variable coefficients . I am trying to find the equilibrium points by hand but it seems like it is not possible without the help of a numerical method. What would be a good method to calculate equilibrium points of the system?
Another question (somehow related to the problem above): Would it be possible to check the stability of the equilibrium points and then draw a bifurcation diagram? If so, please suggest some way out!
e1 = 13;
g = 0.0125;
h = 0.284253;
f = 0.05;
q1 = 0;
k1 = 10;
d1 = 0.0412;
e2 = 0.0188;
j = 0.0082;
q2 = 0;
k2 = 10;
d2 = 0.0288;
b = 2;
d4 = 0.1152;
e3 = 0.166667;
a = 1.7;
q3 = 0;
k3 = 10;
d3 = 0.1152;
r = 0.5;
m = 1.02;
q4 = 0;
k4 = 10;
dydt(1) = e1 + (g*y(3)*y(1)/(h + y(3))) + (f*y(3)*y(1)) - (y(1)*(1 + ((q1/k1)*y(1)))) - (d1*y(1));
dydt(2) = e2*y(2) + (f*y(1)*y(3)) - (j*y(2)) - (y(2)*(1 + ((q2/k2)*y(2)))) - (d2*y(2));
dydt(3) = (b*e2*y(2)) - (d4*y(3));
dydt(4) = e3*y(4) + (j*y(2)) - (a*y(4)) - (y(4)*(1 + ((q3/k3)*y(4)))) - (d3*y(4));
dydt(5) = (r*y(5)*(1 - (m*y(5)))) + (a*y(4)) - y(5)*(1 + ((q4/k4)*y(5)));

请先登录,再回答此问题。

采纳的回答

Torsten
Torsten 2023-4-2
Ran in:
I don't know if the result is as expected.
format long
yequi = fsolve(@fun,rand(5,1))
Equation solved. fsolve completed because the vector of function values is near zero as measured by the value of the function tolerance, and the problem appears regular as measured by the gradient.
yequi = 5×1
12.485593545908634 0.000000000000008 0.000000000000003 0.000000000000000 0.000000000000000
fun(yequi)
ans = 1×5
1.0e-13 * -0.657252030578093 -0.063585506384309 -0.000000000537866 0.000000000086870 -0.000243217417049
function dydt = fun(y)
e1 = 13;
g = 0.0125;
h = 0.284253;
f = 0.05;
q1 = 0;
k1 = 10;
d1 = 0.0412;
e2 = 0.0188;
j = 0.0082;
q2 = 0;
k2 = 10;
d2 = 0.0288;
b = 2;
d4 = 0.1152;
e3 = 0.166667;
a = 1.7;
q3 = 0;
k3 = 10;
d3 = 0.1152;
r = 0.5;
m = 1.02;
q4 = 0;
k4 = 10;
dydt(1) = e1 + (g*y(3)*y(1)/(h + y(3))) + (f*y(3)*y(1)) - (y(1)*(1 + ((q1/k1)*y(1)))) - (d1*y(1));
dydt(2) = e2*y(2) + (f*y(1)*y(3)) - (j*y(2)) - (y(2)*(1 + ((q2/k2)*y(2)))) - (d2*y(2));
dydt(3) = (b*e2*y(2)) - (d4*y(3));
dydt(4) = e3*y(4) + (j*y(2)) - (a*y(4)) - (y(4)*(1 + ((q3/k3)*y(4)))) - (d3*y(4));
dydt(5) = (r*y(5)*(1 - (m*y(5)))) + (a*y(4)) - y(5)*(1 + ((q4/k4)*y(5)));
end
  4 个评论
显示 2更早的评论
Torsten
Torsten 2023-4-2
Is it possible for the equilibrium point to be negative?
It's the numerical error in the equation fun(yequi) that is negative, not the solution itself (yequi) (if this is what you mean with your question).

请先登录,再进行评论。

更多回答(0 个)

类别

Help CenterFile Exchange 中查找有关 Symbolic Math Toolbox 的更多信息

标签

产品


版本

R2021a

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!

Translated by