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Let G=(V,E) be an undirected graph, s and t are two vertices in V. Each edge of the graph is colored either red or blue. I need to find an algorithm that finds a path between s and t that has minimal number of red edges in it.

I thought about the following algorithm: A modified BFS algorithm

For each vertex we will use an extra field called "red level" which will indicate the minimal number of red edges on the path from s to this vertex. Once we discovered a new vertex we will update its red level field. If we are trying to explore a vertex that was already discovered, if the red level of this vertex is larger than then the current red level , than we delete this vertex from the BFS tree and insert it as a child of the vertex whose children we are now exploring, and so on. The desired path is the one connecting s and t in the BFS tree in the end of the algorithm run.

I'm trying now to prove that this algorithm is correct but with little success. I'm also not sure whether it is in fact correct. Any hints/ideas?

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1 Answer 1

up vote 5 down vote accepted

I think it is correct: essntially you are doing Dijkstra's algorithm with weights for red edges being very large, and weights for blue edges being very small or zero.

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Darn! You beat me to it :-P But I think you have it backwards. Red edges are low weight and blue edges are high since he wants to find a path of red edges from S to T. –  Ray Saltrelli Mar 14 '13 at 20:55
    
Sorry! I guess that means that unless we are both idiots this answer is at maximum 0.5 dumb :) –  angelatlarge Mar 14 '13 at 20:56

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