I need to find the shortest alternative path of every edge in a weighted undirected graph,i.e , suppose I had an egde (a,b) in a graph ,then I want to calculate the shortest possible path between vetices a and b skipping the direct path,i.e, edge(a,b) . If there is no alternative path then distance should be infinite. I'd to do this for every edge of a graph.I'd tried with dijkstras algorithm (which will break when target vertex is encountered) but it takes too much time to calculate path individually for every edge ,particularly in cases where no alternative path is possible (in that case whole of the graph has to be traversed). Can you propose any other alternative solution to this.

I guess what I'd do is adapt Dijkstra's algorithm such that I initially populate the heap/priorityqueue with all the paths of length 2 that don't use that edge (Thanks to titus for catching my earlier mistake). That way, the result that you get will exclude the paths that contain exactly one edge. The result then gets you everything for one particular source, and you can repeat this over all possible sources. 


Here is a dijkstra implementation I wrote some time ago, it uses stl make_heap to find the next node more efficently. The implementation is most likely correct. 


The solution suggested by



You just have to simply remove the targeted edge from the graph before performing dijkstras on it..... 

