# Column Rearrangement

Given a Binary matrix in which every row and column contains exactly only one 1. I need to rearrange the matrix columnwise so that it will become identity matrix.

For example, given a Binary matrix

``````Binary = [ 0     1     0     0     0
0     0     1     0     0
1     0     0     0     0
0     0     0     0     1
0     0     0     1     0 ]
``````

To get the identity matrix we rearrange the column as 2 3 1 5 4.

How optimally we can output the rearranged column numbers for any given arbitrary square binary matrix?

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Is your question about how to figure out what order is required, or simply how to perform the reordering itself? –  Oliver Charlesworth Jun 1 '11 at 15:37
@Oli Charlesworth: about the order required to convert binary matrix to identity matrix efficiently –  Learner Jun 1 '11 at 15:41

A very simple way to do this is to use the function FIND like so:

``````[index,~] = find(Binary.');  %'# Transpose the matrix and find the row indices
%#   of the non-zero entries
``````

And you can test that it work as follows:

``````>> Binary(:,index)

ans =

1     0     0     0     0    %# Yup, that's an identity matrix alright!
0     1     0     0     0
0     0     1     0     0
0     0     0     1     0
0     0     0     0     1
``````

OLD APPROACH:

This isn't as compact or efficient as the above solution, but you could also transpose the matrix and use SORTROWS to sort the columns (now transposed into the rows) and return the sort indices. This will actually sort values in ascending order, which will give you an anti-diagonal matrix, so you will want to flip the vector of indices using FLIPUD. Here's the code:

``````[~,index] = sortrows(Binary.');  %'# Transpose and sort the matrix
index = flipud(index);            %# Flip the index vector
``````
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If you know the matrix can be manipulated into an identity matrix, why don't you just create an identity matrix with the same dimensions?

``````identity_matrix=eye(length(Binary))
``````
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maybe because he needs the indices from this matrix to operate on another matrix... –  r.m. Jun 1 '11 at 21:13
@yoda: That was not specified in the question. –  KnowledgeBone Jun 2 '11 at 14:21
@yoda: I will keep that advice in mind. –  KnowledgeBone Jun 2 '11 at 14:29