Changing boundary conditions for ODE

6 views (last 30 days)
Borjan Trajanoski
Borjan Trajanoski on 9 May 2020
Commented: Ameer Hamza on 9 May 2020
My code below plots the solution of the equation of Mathieu with the initial condition: y(0) = 1, y'(0) = 1
Now I still want the same solution to this problem, but with new boundary conditions: y(1) = -1, y(10) = 1
I tried solving it with dsolve(eq, y(1) == -1, y(10) == 1) but then I couldn't implement it into my function.
syms t y(t)
syms a q
tm = [0 75]; %time intervall
figure(1)
clf
hold on
y0=[-1;1]; %initial conditions
[t,y1] = ode23(@Mathieu, tm, y0);
plot(t,y1(:,2))%y(t)
xlim([0 75])
function dydt = Mathieu(t,y)
a = 2;
q = 0.5;
dydt = [y(2); -(a-2*q*cos(2*t))*y(1)];
end
  5 Comments
Show 3 older comments
Borjan Trajanoski
Borjan Trajanoski on 9 May 2020
I just did it with bvp4c, really cool function! And thanks for the additional code :)

Sign in to comment.

Sign in to answer this question.

Accepted Answer

Ameer Hamza
Ameer Hamza on 9 May 2020
Try this code with bvp4c in the limits [1 10], with the boundary condition given in the question. For more details, see the documentation of bvp4c
tm = [1 10]; %time intervall
t = linspace(tm(1), tm(2), 50);
guess = bvpinit(t, [1; 1]);
sol = bvp4c(@Mathieu, @bcFun, guess);
plot(sol.x, sol.y(1,:)) % y(t) is the row of solution
xlim(tm)
function dydt = Mathieu(t,y) %ODE
a = 2;
q = 0.5;
dydt = [y(2); -(a-2*q*cos(2*t))*y(1)];
end
function res = bcFun(ya, yb) % boundary function
res = [ya(1)+1; % y(1)=-1
yb(1)-1]; % y(10) = 1
end

More Answers (1)

Nagaraja Shamsundar
Nagaraja Shamsundar on 9 May 2020
Your goal is to solve a boundary value problem (BVP). Some BVPs can be converted into equivalent initial value problems (IVP), but in general it is more appropriate to use a BVP solver such as Matlab's BVP4C instead of an IVP solver such as ODE23.
In Matlab, type help bvp4c or doc bvp4c.
  1 Comment
Borjan Trajanoski
Borjan Trajanoski on 9 May 2020
Thank you! I didn't know there is an extra function for this kind of problem. I am looking it up right now.

Sign in to comment.

Categories

Find more on Boundary Value Problems in Help Center and File Exchange

Tags

Community Treasure Hunt

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

Start Hunting!