# Board game pathfinding - finding multiple optimal paths

I have a very simple pathfinding task- a board game played on an 8x8 grid, with each square either being passable or not. What I'm looking for is an algorithm which will give me the best n paths to get from some square A to square B (assuming there are any).

I've been looking at A*, but as far as I can see, there's no clear way to extend it to find more than one path.

So, what's critical is that the paths it gives are actually the shortest n paths, that it doesn't miss any. Efficiency is also very important. Could anybody suggest an algorithm that would be appropriate, or point me in the right direction?

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Dijkstra's is a good algorithm for most situations like these, but since you're on an 8x8 grid, I'm going to assume that all the distances between each cell are both equal and static. In this case, a BFS (Breadth First Search) should suit you well.

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Given the small size of the board a breadth-first exhaustive search is something you should be considering. 8 x 8 means only 64 squares, x8 moves (or 4 if you don't permit diagonals) and the total search is pretty small.

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Diagonals aren't permitted, so it is only 4 moves per square. The pathfinding is going to be repeated a very large number of times, so eking out as much efficiency as possible is important –  Stereotomy Jun 5 '11 at 4:35