# Calculating the moments of an image Chebychev

I am a beginner on Chebyshev moments, I programmed a code to calculate the moments of an image and the reconstruction of the image from its moments, I wonder if this code is correct.

``````function t = momentdernier(n,N)

i=0;

if (i==0)
for j=1:N
t(i+1,j) = 1;
end
i=i+1;
end

if(i==1 && i<=n)
for j=1:N
t(i+1,j) = ((2*j)+1-N)/N  ;
end
i=i+1;
end

while(i >= 2 && i<=n  )
for j=1:N
t(i+1,j) = ((((2*i)-1)*t(2,j)*t(i,j)) - ((i-1)*(1-(((i-1).^2)/(N.^2)))*t(i-1,j)))/i;
end
i=i+1;
end

end

**function val=ro(n,N)**

val=1;

for i=0:n-1
val=val*(1-((i*i)/(N*N)));
end

val=val*N/(2*n+1);

end
``````

% For calculation for moments of chebyshev:

``````function T=tchebdernier(img,n,m)

[N,M]=size(img);

prod=0;

T=0;
T1=momentjihen(n,N);
T2=momentjihen(m,M);

for i=1:N
for j=1:M
T=T+(T1(n+1,i)*T2(m+1,j)*img(i,j));
end
end

prod=1/(ro(n,N)*ro(m,M));

T=T*prod;

end
``````

% For reconstructor of image

``````function f = intensitydernier(img,x,y,a,b)

[N,M]=size(img);

f=0;

for i=1:a
for j=1:b
T1= momentjihen(i,N);
T2= momentjihen(j,M);

v1=tchebjihen(img,i,j);
v2=T1(i,x);
v3=T2(j,y);

f=f+(v1*v2*v3);
end
end
end

function  C = contructiondernier(img)

[N,M]=size(img);

C=zeros(N,M);

for i=1:N
for j=1:M
C(i,j)= intensitydernier(img,i,j,a,b);
end
end
end
``````

% example:

``````e=imread('e.png');

img=imresize(e,[20 20]);

T=tchebdernier(img,3,4);

C = contructiondernier(img);

imshow(C)
``````
-
I'd prefer if you describe with matrices (mathematically) what you aim to do. There seem to be an awful lot of for-loops that could be excluded. Your code might be correct but it sure is inefficient. –  Barnabas Szabolcs Nov 29 '12 at 16:20
I think a link describing what Chebyshev moments are would be also good. –  Barnabas Szabolcs Nov 29 '12 at 16:23