If I have an array of 4 dimensions say A=complex(​rand(2,2,2​,2),rand(2​,2,2,2)). If I need to calculate the inverse of this matrix, as defined beow , how should I do it?

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vishav Rattu
vishav Rattu il 21 Ott 2016
Commentato: vishav Rattu il 21 Ott 2016
I need to compute B(x,y,z,w) such that if I multiply the terms of A and B , I should get an identity matrix I(a,b,c,d):
I=zeros(a,b,c,d);
for a=1:2
for b=1:2
for c=1:2
for d=1:2
for i=1:2
for j=1:2
I(a,b,c,d)=A(a,b,i,j)*B(i,j,c,d)+I(a,b,c,d);
end
end
end
end
end
end
The I(a,b,c,d)= 1 only when a=b=c=d
  2 Commenti
Matt J
Matt J il 21 Ott 2016
It is puzzling that you are organizing your data in 4D form, when you appear to want to do simple 2D matrix algebra with it. Are you sure it wouldn't be better just to reshape your data into 2D form
A=reshape(A,4,4)
and keep it that way?
vishav Rattu
vishav Rattu il 21 Ott 2016
Modificato: vishav Rattu il 21 Ott 2016
But if I reshape it, will I get the above B matrix that is required? That is, will B satisfy the above condition, that is I(a,b,c,d)=1 only if a=b=c=d? If I am able to get such a B, then I don't need to keep it in a 4d form.

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Matt J
Matt J il 21 Ott 2016
[a,b,c,d]=ndgrid(1:2);
I=reshape(a==b & b==c & c==d, 4,4);
A=reshape(A,4,4);
B=reshape( A\I , 2,2,2,2);

Più risposte (1)

KSSV
KSSV il 21 Ott 2016
Are you looking for something like this?
A = rand(2,2,2,2) ;
B = zeros(2,2,2,2) ;
for i = 1:2
for j = 1:2
B(:,:,i,j) = inv(A(:,:,i,j)) ;
end
end
% check
for i = 1:2
for j = 1:2
A(:,:,i,j)*B(:,:,i,j)
end
end

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