A compact way to replace zeros with Inf in a matrix

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Sim
Sim il 16 Ott 2023
Modificato: Sim il 23 Ott 2023
Ran in:
Would you be so nice to suggest me a more compact way to replace zeros with Inf in the following matrix? (maybe with just one line of code?)
% Input
A = [0 3 2 5 6;
1 1 4 3 2;
9 0 8 1 1;
5 9 8 2 0;
3 1 7 6 9];
% Replace zeros with Inf
[row,col] = ind2sub(size(A),find(A==0));
for i = 1 : length(row)
A(row(i),col(i))=Inf;
end
% Output
A
A = 5×5
Inf 3 2 5 6 1 1 4 3 2 9 Inf 8 1 1 5 9 8 2 Inf 3 1 7 6 9

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J. Alex Lee
J. Alex Lee il 16 Ott 2023
Modificato: J. Alex Lee il 16 Ott 2023
Ran in:
You can implicitly index "linearly" for any arrays - it will do all the ind2sub and sub2ind in the background:
% Input
A = [0 3 2 5 6;
1 1 4 3 2;
9 0 8 1 1;
5 9 8 2 0;
3 1 7 6 9];
B = A;
% Replace zeros with Inf
[row,col] = ind2sub(size(A),find(A==0));
for i = 1 : 3
A(row(i),col(i))=Inf;
end
% Output
A
A = 5×5
Inf 3 2 5 6 1 1 4 3 2 9 Inf 8 1 1 5 9 8 2 Inf 3 1 7 6 9
B(B==0) = Inf
B = 5×5
Inf 3 2 5 6 1 1 4 3 2 9 Inf 8 1 1 5 9 8 2 Inf 3 1 7 6 9
isequal(A,B)
ans = logical
1

Più risposte (4)

Les Beckham
Les Beckham il 16 Ott 2023
Modificato: Les Beckham il 16 Ott 2023
Ran in:
If you want to retain the non-zero elements of A and replace the zeros with Inf, then this is how I would suggest that you do that.
% Input
A = [0 3 2 5 6;
1 1 4 3 2;
9 0 8 1 1;
5 9 8 2 0;
3 1 7 6 9];
A(A==0) = Inf
A = 5×5
Inf 3 2 5 6 1 1 4 3 2 9 Inf 8 1 1 5 9 8 2 Inf 3 1 7 6 9
Note that your loop doesn't do this, it creates a matrix with Inf in the positions of the zeros in A and zero everywhere else. If that is really what you want then you could do that like this.
A = [0 3 2 5 6;
1 1 4 3 2;
9 0 8 1 1;
5 9 8 2 0;
3 1 7 6 9];
B = zeros(size(A));
B(A==0) = Inf
B = 5×5
Inf 0 0 0 0 0 0 0 0 0 0 Inf 0 0 0 0 0 0 0 Inf 0 0 0 0 0
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Les Beckham
Les Beckham il 16 Ott 2023
Modificato: Les Beckham il 16 Ott 2023
You are quite welcome.
If you are just getting started with Matlab, I would highly recommend that you take a couple of hours to go through the free online tutorial: Matlab Onramp

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Matt J
Matt J il 16 Ott 2023
Ran in:
Allso just for fun.
A = [0 3 2 5 6;
1 1 4 3 2;
9 0 8 1 1;
5 9 8 2 0;
3 1 7 6 9];
A=A+1./(A~=0)-1
A = 5×5
Inf 3 2 5 6 1 1 4 3 2 9 Inf 8 1 1 5 9 8 2 Inf 3 1 7 6 9
Walter Roberson
Walter Roberson il 23 Ott 2023
Ran in:
A = [0 3 2 5 6;
1 1 4 3 2;
9 0 8 1 1;
5 9 8 2 0;
3 1 7 6 9];
A(~A) = inf
A = 5×5
Inf 3 2 5 6 1 1 4 3 2 9 Inf 8 1 1 5 9 8 2 Inf 3 1 7 6 9
  2 Commenti
J. Alex Lee
J. Alex Lee il 23 Ott 2023
by the way, on huge matrices this is actually faster than testing for zero.
Sim
Sim il 23 Ott 2023
Modificato: Sim il 23 Ott 2023
@Walter Roberson Wow!! Thumb up! :-)

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Alexander
Alexander il 16 Ott 2023
Only for fun. My maybe a bit old-fashoned approach would be:
B=1./A;
B(B==Inf)=0;
C=1./B
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Alexander
Alexander il 22 Ott 2023
Thanks @Stephen23 for the advice and yes, there are precision errors. But I think it depends on the problem you have to solve whether these are significant or not.
Stephen23
Stephen23 il 23 Ott 2023
"But I think it depends on the problem you have to solve whether these are significant or not."
I can't think of many problems where a more complex, slower, obfuscated approach with precision errors would be preferred over the simpler, clearer, much more robust approach using indexing. Can you give an example?

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