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 ?
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) =
2