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Suppose I have a matrix A and I sort the rows of this matrix. How do I replicate the same ordering on a matrix B (same size of course)?

E.g.

A = rand(3,4);
[val ind] = sort(A,2);
B = rand(3,4);
%// Reorder the elements of B according to the reordering of A

This is the best I've come up with

m = size(A,1);
B = B(bsxfun(@plus,(ind-1)*m,(1:m)'));

Out of curiosity, any alternatives?

Update: Jonas' excellent solution profiled on 2008a (XP):

n = n

0.048524       1.4632       1.4791        1.195       1.0662        1.108       1.0082      0.96335      0.93155      0.90532      0.88976

n = 2m

0.63202       1.3029       1.1112       1.0501      0.94703      0.92847      0.90411       0.8849       0.8667      0.92098      0.85569

It just goes to show that loops aren't anathema to MATLAB programmers anymore thanks to JITA (perhaps).

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Easy in J: B/:A :) –  David Apr 20 '10 at 22:50
2  
Lol .. it took me a second to realize you were referring to another language .. was wondering what esoteric MATLAB syntax I was looking at! –  Jacob Apr 20 '10 at 23:00

3 Answers 3

up vote 13 down vote accepted

A somewhat clearer way to do this is to use a loop

A = rand(3,4);
B = rand(3,4);
[sortedA,ind] = sort(A,2);

for r = 1:size(A,1)
   B(r,:) = B(r,ind(r,:));
end

Interestingly, the loop version is faster for small (<12 rows) and large (>~700 rows) square arrays (r2010a, OS X). The more columns there are relative to rows, the better the loop performs.

Here's the code I quickly hacked up for testing:

siz = 10:100:1010;

tt = zeros(100,2,length(siz));

for s = siz

for k = 1:100   

A = rand(s,1*s);
B = rand(s,1*s);
[sortedA,ind] = sort(A,2);



tic
for r = 1:size(A,1)
   B(r,:) = B(r,ind(r,:));
end,tt(k,1,s==siz) = toc;

tic
m = size(A,1);
B = B(bsxfun(@plus,(ind-1)*m,(1:m)'));  %'
tt(k,2,s==siz) = toc;

end
end

m = squeeze(mean(tt,1));


m(1,:)./m(2,:)

For square arrays

ans =

0.7149    2.1508    1.2203    1.4684    1.2339    1.1855    1.0212    1.0201    0.8770       0.8584    0.8405

For twice as many columns as there are rows (same number of rows)

ans =

    0.8431    1.2874    1.3550    1.1311    0.9979    0.9921    0.8263    0.7697    0.6856    0.7004    0.7314
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+1 - Impressive! I guess the JIT is pretty powerful now. I'll post results for R2008a soon. –  Jacob Apr 21 '10 at 14:42

Sort() returns the index along the dimension you sorted on. You can explicitly construct indexes for the other dimensions that cause the rows to remain stable, and then use linear indexing to rearrange the whole array.

A = rand(3,4);
B = A; %// Start with same values so we can programmatically check result

[A2 ix2] = sort(A,2);
%// ix2 is the index along dimension 2, and we want dimension 1 to remain unchanged
ix1 = repmat([1:size(A,1)]', [1 size(A,2)]); %//'
%// Convert to linear index equivalent of the reordering of the sort() call
ix = sub2ind(size(A), ix1, ix2) 
%// And apply it
B2 = B(ix)
ok = isequal(A2, B2) %// confirm reordering
share|improve this answer
    
Nice. It would be interesting to compare timing for this solution as well. –  yuk Apr 21 '10 at 15:47
    
On the surface, it looks very similar to mine except I manually compute the linear indices and use bsxfun. –  Jacob Apr 21 '10 at 17:22
    
Sad to say it's a loser performancewise. On my R2010a, this is about 25% slower than either the loop or bsxfun solution. –  Andrew Janke Apr 21 '10 at 17:25
    
@Jacob: I think you're right, and I just had trouble reading the bsxfun() code. This doesn't seem like an improvement on OP after all. –  Andrew Janke Apr 21 '10 at 17:45
2  
@Jacob: repmat has only a single function. When I thus read repmat, I know what's going to happen. When I read bsxfun, I know that I have to really pay attention now. Having said that, it makes me happy every time I get to write bsxfun. bsxfun bsxfun bsxfun –  Jonas Apr 21 '10 at 19:15

Can't you just do this?

[val ind]=sort(A);
B=B(ind);

It worked for me, unless I'm understanding your problem wrong.

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2  
ind contains only row indices. B = B(ind) does not give the result required. –  Alex Nov 29 '12 at 22:17

protected by Shai Dec 2 '13 at 12:36

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