how to solve a second order differential equation using Euler's method?

17 Apr 2018
2 Answers
Answer Accepted
Updated 18 Apr 2018
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How to solve a second order differential equation (boundary value problem) using Euler's Method without using inbuilt matlab functions such as ode45?

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James Tursa
James Tursa on 17 Apr 2018
What instructions were you given in class? What have you done so far? What specific problems are you having with your code?
Remston Martis
Remston Martis on 18 Apr 2018
Edited: Remston Martis on 18 Apr 2018
I have a second order differential equations with 2 boundary conditions.
I have to use Euler's method(the shooting method) to solve the equation.
I am able to code for a first order differential equation but not for a second order differential equation.
function Eout = Eulers(F, yint,h,yfinal,x0)
% F is the desired differential equation
% yint and yfinal are the boundary value conditions
% h is the step size
% x0 is the initial guess
x = x0;
Eout = x;
for y = yint : h : tfinal-h
s = F(y,x);
x = x + h*s;
Eout = [Eout; x];
end
The code works for a simple first order differential equation.
My differential equation is d^2y/dx^2 = 2y +8x(9-x)
I have managed to solve it mathematically on paper but am struggling with the code. I can provide you with the mathematical solution if you require it.

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 Accepted Answer

Torsten
Torsten on 18 Apr 2018

0 votes

If you define

F=@(y,x)[y(2);2*y(1)+8*x*(9-x)]

you can work with the code from above.

Best wishes

Torsten.

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Remston Martis
Remston Martis on 18 Apr 2018
When I do that I receive the error "Index exceeds array bounds"
Torsten
Torsten on 18 Apr 2018
You've set x0 as a (2x1) vector, haven't you ?
Jan
Jan on 18 Apr 2018
Edited: Jan on 18 Apr 2018
@Remston Matris: Please post the complete error message, such that the readers do not have to guess, in which line the error occurs.
Remston Martis
Remston Martis on 18 Apr 2018
Sorry for being excessively terse.
error message "Error in @(y,x)[y(2);2*y(1)+8*x*(9-x)]
Error in Eulers(line 14) s=F(y,x)
Remston Martis
Remston Martis on 18 Apr 2018
Edited: Remston Martis on 18 Apr 2018
I have not set x0 as a vector. It is an integer.
x0 is my initial "shooting" guess. I do not understand why it should be a vector.
Torsten
Torsten on 18 Apr 2018
Edited: Torsten on 18 Apr 2018
You have a second order differential equation.
This has to be written as a system of two first-order ODEs:
y1'=y2
y2'=y1+8*x*(9-x)
So you will need two initial values.
That's the reason why x0 (and x) are (2x1).
But I think, according to your notation y is the independent variable and x is the dependent variable to be solved for. Thus, F has to read
F=@(y,x)[x(2);2*x(1)+8*y*(9-y)]
Remston Martis
Remston Martis on 18 Apr 2018
No, y is my dependent variable. I'll try your code and revert if it works. I think I understand where you're getting at. Thank you .
Torsten
Torsten on 18 Apr 2018
y can't be your dependent variable because you update x as
x = x + h*s;
where s is obtained by
s = F(y,x);
Jan
Jan on 18 Apr 2018
@Remston Martis: Using y, x and t causes confusion here. You have e.g. "yfinal" and "tfinal". Use either "x and y" or "x and t". Then:
function dx = F(t, x)
dx = [x(2); x(1) + 8 * t * (9 - t)];
end
Now "yint and yfinal are the boundary value conditions" confuses me, but I assume you want something like:
x = x0;
tvec = tint:h:tfinal-h;
Eout = zeros(2, size(tvec));
Eout(:, 1) = x;
for idx = 1:length(tvec)
t = tvec(idx);
dx = F(t,x);
x = x + h * dx;
Eout(:, idx) = x;
end

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More Answers (1)

Jan
Jan on 18 Apr 2018

0 votes

It is worth to be nitpicking:

 % x0 is the initial guess

No, x0 is the initial value of the trajectory when you consider the integration. To solve a boundary value problem, you need an additional layer around the integration: e.g. a single shooting or multiple shooting method. Then this x0 is the initial guess of the shooting method.

To solve your problem, convert the 2nd order equation to a system of two equations of order 1. Then y has 2 components: The initial position and velocity. Converting higher order equations to order 1 is the first step for almost all integrators.

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Remston Martis
Remston Martis on 18 Apr 2018
Hi, Thank you for the information. I have actually solved the entire question on paper but mathematically so I guess I'm on the same page with what you have stated.
However, I do not know how to apply the 2nd order equation conversion into my code. I am unable to translate it into the code.
Would greatly appreciate if you could just help with those couple lines of code that I could add into the above.
Thank you!

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Remston Martis
Remston Martis
on 17 Apr 2018

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Jan
Jan
on 18 Apr 2018

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