# Bisdimensioal integral and choleski matrix factorisation

Starting from this:

``````Cij2=zeros(3,3,Nx,Ny,Nz);
[x y z]=ndgrid(1:Nx,1:Ny,1:Nz);
k1=(x-Nx/2)*l/(Nx*delta)*twopi;
k2=(y-Ny/2)*l/(Ny*delta)*twopi;
k3=(z-Nz/2)*l/(Nz*delta)*twopi;
kabs=sqrt(k1.^2+k2.^2+k3.^2);
beta= gamma./(kabs.^(2/3));
k03=k3+beta.*k1;
k0abs=sqrt(k1.^2+k2.^2+k03.^2);
Ek0=1.453*k0abs.^4./(1+k0abs.^2).^(17/6);
C1=beta.*k1.^2.*( k0abs.^2 - 2*k03.^2 + beta.*k1.*k03 )./( kabs.^2.*( k1.^2 + k2.^2 ));
C2=k2.*k0abs.^2./ (exp( (3/2).*log( k1.^2 + k2.^2 ) )) .* atan2( beta.*k1.* sqrt( k1.^2 + k2.^2 ) ,( k0abs.^2 - k03.*k1.*beta));
xhsi1=C1 - k2.*C2./k1;
xhsi2=k2.*C1./k1 + C2;
CC=sigmaiso*sqrt(twopi*pi*l^3.*Ek0./(Nx*Ny*Nz*delta^3.*k0abs.^4));
Cij2(1,1,:,:,:)= CC.*( k2.*xhsi1);
Cij2(1,2,:,:,:)= CC.*( k3 - k1.*xhsi1 + beta.*k1);
Cij2(1,3,:,:,:)= CC.*( -k2);
Cij2(2,1,:,:,:)= CC.*( k2.*xhsi2 - k3 - beta.*k1);
Cij2(2,2,:,:,:)= CC.*( -k1.*xhsi2);
Cij2(2,3,:,:,:)= CC.*( k1);
Cij2(3,1,:,:,:)= CC.*( k0abs.^2.*k2 ./ (kabs.^2));
Cij2(3,2,:,:,:)= CC.*( -k0abs.^2.*k1 ./ (kabs.^2));
``````

I would like to perform:

``````INT Cij2(k1 k2 k3) dk2 dk3 * (Dk1)
``````

Where Dk1 is the wave number interval used, i.e. k1[i+1] – k1[i] Now I need to do a double integral of Cij2[i,j] over the square with corners (I write deltak as Dk)

``````k2-Dk2/2 k3-Dk3/2
k2-Dk2/2 k3+Dk3/2
k2+Dk2/2 k3-Dk3/2
k2+Dk2/2 k3+Dk3/2
``````

I thought to perform it with a simple 9 points Simpson-type integration (weights for the 9 points

``````1/36 1/9 1/36
1/9 4/9 1/9
1/36 1/9 1/36
``````

would already be quite good. Once I have the 9 matrix entries, I wanna do the Cholesky decomposition.

Does anybody have a clue?Any advice would be really appreciated. I thank you in advance.

-
I have no idea what you're talking about. Can you at least point to the paper you're using? Is this a programming question at all? –  Phonon Dec 22 '11 at 21:36
Hallo,first of all there is no paper to be appointend,unfortunately. Then,it is a programming question since Matlab should support some standard functions allowing the user to calculate integrals (I mean int,quad,etc.). Neglecting the references about Simpons integral, is there any way to get this double integral? Regards. –  fpe Dec 23 '11 at 7:27
So does not anybody have an idea on how to perform this double integral in Matlab?? I was thinking to use quad2d or dblquad –  fpe Dec 23 '11 at 12:09