# grid stack of characteristic curves(lines)

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?

-

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.

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.