# Finding the indices of all edges within k steps from a chosen line in an adjacency matrix

I have a function where I can find all nodes k number of steps from any initial set of nodes in a sparse adjacency matrix. Normally this initial set is the to-from node for a single branch. I want a list of the branches "used" to reach these nodes.

The function I use to find the connected nodes is as follows:

``````% nb = number of buses in the system
% branch_list = [from to] = the from/to nodes of each branch
node_vec0 = sparse([from to],1,1,nb,1);
node_vec = A * node_vec0; % Vector containing all nodes connected to node_vec0
``````

I can repeat the last line k times, and find all nodes k steps from the inital nodes.

What I want to do, is to find the row (in the branch list) of each branch used to reach these nodes.

Is there an efficient way of doing this?

Thank you!

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You can use k-shortest path algorithm to achieve what you want. http://en.wikipedia.org/wiki/K_shortest_path_routing –  Bill May 4 '13 at 3:01
The algorithm seems a bit too complicated for what I'm trying to achieve. Do you have an idea if breadth-first search alone will be faster than using the method above to determine all nodes closer than k-steps away, followed by the k-shortest path algorithm, with these nodes as destination nodes, to find the branches? –  Robert P. May 4 '13 at 13:56
You may be able to use depth-first-search, where depth can be interpreted as the distance between the nodes. –  Bill May 4 '13 at 14:03