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I have a nx2 matrix of to-from nodes for a large network structure. I have used this to create a sparse adjacency matrix which I can plot using BIOGRAPH. My systems varies in size, the largest ones having more than 3000 nodes (obviously not suitable for plotting).

If I choose a line, I want to be able to create a list of all lines and nodes that are within X "steps" from the original line (two nodes), for a given X (typically 3). It's clearly not too difficult using brute-force. However, I need to do this as quick as possible.

  adj_mat = sparse(from_nodes, to_nodes, 1, s, s); 

Is there a way I can to this using the adjacency matrix? Can I do it more efficiently using the to/from list?

What I do now is finding the indices for the nodes connected to the chosen line, then search through the entire list of to-from nodes and finding all lines where either the to/from element is equal to one of the nodes of the chosen line. Then I use the new list of nodes and search through the entire to/from list, searching for these nodes again.

The code I use now looks something like this:

  % tempBranch = the branches connected to the list of the current branches
  k = 1;
  for i = 1:nnz(nodeList)   % number of after step X-1 (for X=0 this is 
                            % equal to the nodes connected to the chosen line
      for j = 1:n           % n = number of lines
          if branchList(j,1) == nodeList(i) || branchList(j,2) == nodeList(i)
              tempBranch(k) = j;
              k = k + 1;

Thank you!

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Do you have the Bioinformatics Toolbox installed? –  Eitan T May 2 '13 at 10:04
@eitan-t: Yes. Do you know if the getrelatives function is efficient? This will be translated to another language later, thus if a code (or pseudo-code) is possible to achieve, that would be great! –  Stewie Griffin May 2 '13 at 10:17

1 Answer 1

up vote 0 down vote accepted

A good starting point is to find all the nodes that are less than k edge away from the two given nodes i and j. This is very easy using the adjacency matrix that you have built.

  1. Add 1 on the diagonal of your matrix A.
  2. Build a vector v of all 0, excepted on the components i and j, where you put 1.
  3. Now, compute A^k*v. All the nodes for which the entry is non-zero are within k edges from the two starting points (remark that the value of the entry is the number of k-paths!). You can automate the extraction of these indices with the find function.

This should be quite efficient!

From the nodes, I think that it should be easy to find the edges that you are looking for.

Hope it helps!

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Thank you! This was exactly the sort of solution I was looking for! =) –  Stewie Griffin May 2 '13 at 11:59
I figured out that if I want to expand my system further, the most efficient is not to take the k'th power of A, but rather do the following: 'while ~finished v = A * v; end' –  Stewie Griffin May 3 '13 at 11:38
I don't exactly know how Matlab computes the power of a matrix, but it's possible that your solution is indeed faster. Thank you for the update! –  Dr_Sam May 3 '13 at 12:21

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