Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I want to be able to simulate a hyperbolic equation on characteristic curves (lines). I will start with a basic one. u_{t}+2u_{x}=u^{2} with initial data u(x,0)=cos(x). The solution is u(x,t)=cos(x-2t)/(1-t*cos(x-2t)) where the charackteristic curve is x=2*t+x_{0}. So the solution is defined on characteristics (method of characteristics).

x=zeros(10,5);
u=zeros(10,5);
x0=linspace(0,10,10);
t=linspace(0,5,5);
for i=1:length(x0)
    for j=1:length(t)
        x(i,j)=2*t(j)+x0(i);
        if t(j)*cos(x(i,j)-2*t(j))==1
            u(i,j)=0;
        else
            u(i,j)=cos(x(i,j)-2*t(j))/(1-t(j)*cos(x(i,j)-2*t(j)));
        end
    end
end
mesh(u)

Apperently, the grid of characteristic lines and rectangular grid do not fit eachother. How can I plot the solutions on characteristics?

share|improve this question

1 Answer 1

Firstly, you do not have a rectangular grid due to this line

x(i,j)=2*t(j)+x0(i);

I am not entirely sure what you are asking. I get the impression that you might want to plot the surface of u over the irregular mesh x. If this is indeed the case, you may find the following like enables you to do what you need - although it does look like you will need to do some tweaking of your code.

http://blogs.mathworks.com/videos/2007/11/02/advanced-matlab-surface-plot-of-nonuniform-data/

Alternatively, you could just redesign your code such that x results in a rectangular grid - I cannot say for sure as maybe there is a reason that you only consider these particular points.

If you get no better answers, the above link could enable you to get what you want (assuming I have understood your question correctly).

share|improve this answer

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.