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I need a heuristic for the Traveling Salesman Problem with the below changes:

• We need to visit only a subset of V (There is given a subset of V that we must visit). V=Cities.

• We does not need to end the travel at the start vertex(city).

Is there a known name for this problem? That I'll be able to find a good heuristic to solve it?

Thanks advanced :)

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Is there restrictions (Such as must path through each vertex not in V at most once?) If not, I think you can find all-to-all shortest paths, and reduce the problem to normal TSP on V, with modified edges weight according to all-to-all shortest paths. –  amit Aug 16 '12 at 12:14
    
Thanks Amit, sounds good, how do I address the other difference (We does not need to end the travel at the start vertex)? As I know TSP need to end it's travel at the start vertex, how do I avoid this? I just need to pass through all the "special" vertices (vertices in the subset) and stop there. –  GalDude33 Aug 17 '12 at 12:23

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