I want to plot an isosurface of a function v.
Problem is that v doesn't accept matrix arguments (not vectorizable function as it contains Laguerre associated polynomials)
So if I create a meshgrid for the values of x,y,l
[r,th,l]=meshgrid(0:0.5:5,0:pi/2:2*pi,0:2); x=r.*cos(th); y=r.*sin(th);
Then I suppose to evaluate v using loops (counters) as I can not bypass x , y & l as arguments
But I'm doing something wrong, and as a consequence I'm not evaluating v in the points of the grid:
for l=0:2 k=k+1; for r=0:0.5:5 i=i+1; for th=0:pi/2:2*pi j=j+1; fun1=@(R)4*real(exp(-r.^2-R^2+2*1i*R*l./r).*(r+1i*R).^(2*l).*... (mfun('L',n/2-l/2,l,r.^2+R^2)).^2); v(i,j,k)=integral(fun1,-inf,inf); end end end
does someone knows how to do the loops so I can obtain a v that matches in size with x, y, l so I can use:
or does someone knows how to obtain the mentioned isosurface v through an alternative way?
I really need all the help I can get :)