# Algorithm: shortest path between all points

Suppose I have 10 points. I know the distance between each point.

I need to find the shortest possible route passing through all points.

I have tried a couple of algorithms (Dijkstra, Floyd Warshall,...) and they all give me the shortest path between start and end, but they don't make a route with all points on it.

Permutations work fine, but they are too resource-expensive.

What algorithms can you advise me to look into for this problem? Or is there a documented way to do this with the above-mentioned algorithms?

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If there are only 10 points, then that's only 3,628,800 permutations. That's not terribly expensive. Are you expecting to do a lot of these? –  Jeffrey L Whitledge Mar 23 '10 at 16:34
10 points was an example. We have to write a script that can take any number of points. –  Jeroen Mar 26 '10 at 13:39

Have a look at travelling salesman problem.

You may want to look into some of the heuristic solutions. They may not be able to give you 100% exact results, but often they can come up with good enough solutions (2 to 3 % away from optimal solutions) in a reasonable amount of time.

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You can guarantee less than 2 MST in linear time. –  NickLarsen Mar 23 '10 at 20:46
Travelling salesman looks like what I need with the difference that it's not a closed circuit. Will have a look at the heuristic solutions. Tnx! –  Jeroen Mar 26 '10 at 13:40

This is obviously Travelling Salesman problem. Specifically for `N=10`, you can either try the `O(N!)` naive algorithm, or using Dynamic Programming, you can reduce this to `O(n^2 2^n)`, by trading space.

Beyond that, since this is an NP-hard problem, you can only hope for an approximation or heuristic, given the usual caveats.

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As others have mentioned, this is an instance of the TSP. I think Concord, developed at Georgia Tech is the current state-of-the-art solver. It can handle upwards of 10,000 points within a few seconds. It also has an API that's easy to work with.

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