Solving two differential equations using ode45

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Nagarajan
Nagarajan le 3 Juin 2019
Commenté : Nagarajan le 4 Juin 2019
I have two differential equations in the form
-y"-5y'-y=3x"+4x'^2+2x+6t
-y"-2.3y'-2y=2x"+3x'^2+x
I would like to solve these equations using ODE's
the inital conditions are x(0), y(0), x'(0) and y'(0) are known
Thanks in advance
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Stephan
Stephan le 3 Juin 2019
Do you have access to the Symbolic Math Toolbox?
Nagarajan
Nagarajan le 3 Juin 2019
Yeah i do have access
I need assistance while converting the variables
fun=@(t,y)[.....]; % change of variables..
Y0=[x0; x0prime; y0; y0prime]; % initial conditions
tspan=[0 2];
[T,Y]=ode45(fun,tspan,Y0);

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Stephan
Stephan le 3 Juin 2019
Modifié(e) : Stephan le 3 Juin 2019
This will help:
https://de.mathworks.com/help/symbolic/odetovectorfield.html
Follow the given examples and adapt them to your needs - for example:
syms y(t) x(t) t
ode(1) = -(diff(y,t,2))-5*diff(y,t)-y == 3*diff(x,t,2)+4*diff(x,t)^2+2*x+6*t;
ode(2) = -(diff(y,t,2))-2.3*diff(y,t)-2*y == 2*diff(x,t,2)+3*diff(x,t)^2+x;
pretty(ode)
[V,S] = odeToVectorField(ode)
fun = matlabFunction(V,'Vars',{'t','Y'})
x0 = [2 0 3 0.25];
[t, sol] = ode45(fun,[0 2], x0);
subplot(2,2,1)
plot(t,sol(:,1),'-r')
subplot(2,2,2)
plot(t,sol(:,2),'-b')
subplot(2,2,3)
plot(t,sol(:,1),'-g')
subplot(2,2,4)
plot(t,sol(:,2),'-k')
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Nagarajan
Nagarajan le 4 Juin 2019
Thank you stephan, a clear explanation.

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Steven Lord
Steven Lord le 3 Juin 2019
Let v = [x; x'; y; y']. This means v' = [x'; x''; y'; y''].
Can you express x' in terms of some of the elements of v? Sure, it's just v(2). Expressing y' in terms of elements of v is also easy, it's v(4). So we have half the right-hand side of our system of ODEs. We still have two pieces to fill in; I'll represent them by placeholders in the (pseudo)code below.
dvdt = [v(2);
something;
v(4);
somethingElse];
Now things get a bit trickier. You can't isolate y'' or x'' as a function solely of x, x', y, y', and t. So you're going to need to use a Mass matrix. The ODE you're going to solve is not v' = f(t, y) but M*v' = f(t, y). If we rewrite your first ODE to put the second derivatives together on the left side of the equals sign:
-y''-3*x'' = 5*y'+y+4*x'^2+2*x+6*t
The left side is [0 -3 0 -1]*v (to show this, expand it out: 0*x'-3*x''+0*y'-y''). Let's put that in the second row of our mass matrix. The first and third rows are just the corresponding rows of the identity matrix, since [1 0 0 0]*v == x' and v(2) == x' and similarly for [0 0 1 0]*v and v(4) both representing y'.
M = [1 0 0 0;
0 -3 0 -1;
0 0 1 0;
aDifferentSomethingElse];
dvdt = [v(2);
something;
v(4);
somethingElse];
Fill in the something part of dvdt using the right side of that rewritten first ODE. Do the same type of manipulation (pull the second derivates to the left side of the equals sign) for the second ODE to fill in aDifferentSomethingElse and somethingElse.
Now write a function to evaluate dvdt as a function of t and v. You will need to use odeset to create an options structure containing your Mass matrix M. Pass the function and the options structure into ode45.
Technically you could have pulled both the first and second derivatives to the left side of the equals sign, and had all the elements of that row of the mass matrix be non-zero. But I wanted to keep this a little simple (too late, I know) so I pulled just the second derivatives into the Mass matrix.
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Nagarajan
Nagarajan le 4 Juin 2019
Thank you steven, Your answer gave a clear explanation in solving the ODE's

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