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I have and undirected graph that is in itself a simple cycle like this

a---b---c
|       |       
d---e---f

Which is the fastest way to compute all-pair shortest paths knowing this condition ?

1 Answer 1

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In one pass starting from A traverse the graph clockwise, and for every node compute the distance from A. Let's say the distance to the node X is a[X]. This way for any pair (X, Y) of nodes the distance will be:

min(abs(aX - aY), total - abs(aY - aX))

Where total is the sum of all the edges weights.

In your case a[B] (I will use upper case for nodes) would be 1, a[C] would be 2, a[D] would be 3 etc and the total would be 6. Then if you want to compute the distance between b and f, it would be

min(abs(aB - aF), total - abs(aB - aF)) = 
min(abs( 1 -  3),     6 - abs( 1 -  3)) = 
min(           2,                    4) =
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  • i don't follow it , can you expand a little more your response. Jul 21, 2015 at 1:58

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