how to solve non linear differential equations
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dx(t)/dt=y(t)
dy(t)/dt=-(1/r+g+a+b|x(t)|)y(t)/c-x(t)/(lc)
t=-0.05:0.01:0.05
r = 1430;
a = -0.0683;
b = 0.0676;
c = 36*10^-9;
g = -0.0676;
l=27
i want to plot phase portrait of (x(t),y(t)) and plots for (t,x(t)),(t,y(t))
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Answers (1)
Bjorn Gustavsson
on 3 Mar 2021
Edited: Bjorn Gustavsson
on 4 Mar 2021
Have a look at the help and documentation of ode45 and the numerous ode-examples.
In brief to solve this ODE-system write a matlab-function for the derivatives:
function dxdtdydt = your_ode(t,xy,pars)
r = pars(1);
a = pars(2);
b = pars(3);
c = pars(4);
g = pars(5);
l = pars(6);
y = xy(2);
x = xy(1);
dxdt = xy(2);
dydt = -(1/r+g+a+b*abs(x)*y/c-x/(l*c));
dxdtdydt = [dxdt;
dydt];
That ode you then integrate from some initial state over some time-period of interest
r = 1430;
a = -0.0683;
b = 0.0676;
c = 36*10^-9;
g = -0.0676;
l=27;
pars = [r,a,b,c,g,l];
t = -0.05:0.01:0.05;
x0y0 = [0,1]; % I wouldn't know.
[t,xy] = ode45(@(t,xy) your_ode(t,xy,pars),t,x0y0);
HTH
13 Comments
Bjorn Gustavsson
on 5 Mar 2021
Well the solution does not look like a sine-wave. That is because I have yet another typo in the ODE, you will surely find it if you look close and read the code, and think about what you need to obtain an oscillating solution.
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