Floyd Warshall Algorithm
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Floyd-Warshall Algorithm
The Floyd-Warshall algorithm is a graph-analysis algorithm that calculates shortest paths between all pairs of nodes in a graph. It is a dynamic programming algorithm with O(|V|3) time complexity and O(|V|2) space complexity. For path reconstruction, see here; for a more efficient algorithm for sparse graphs, see Johnson's algorithm.
Contents
Original source taken from Floyd-Warshall algorithm.
1 /* Assume a function edgeCost(i,j) which returns the cost of the edge from i to j 2 (infinity if there is none). 3 Also assume that n is the number of vertices and edgeCost(i,i)=0 4 */ 5 6 int path[][]; 7 /* A 2-dimensional matrix. At each step in the algorithm, path[i][j] is the shortest path 8 from i to j using intermediate vertices (1..k-1). Each path[i][j] is initialized to 9 edgeCost(i,j) or infinity if there is no edge between i and j. 10 */ 11 12 procedure FloydWarshall () 13 for to 14 for each in 15 path[i][j] = min ( path[i][j], path[i][k]+path[k][j] );
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