Shortest Path in a Graph: Difference between revisions
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=Algorithm= | =Algorithm= | ||
The algorithm is (differences to the canonical BFS algorithm are emphasized): | The algorithm is (differences to the [[Graph_Search#BFS_Algorithm_Pseudocode|canonical BFS]] algorithm are emphasized): | ||
<font size=-1> | <font size=-1> | ||
BFS_with_Shortest_Path(graph G, start vertex s) | BFS_with_Shortest_Path(graph G, start vertex s) | ||
Revision as of 23:06, 1 October 2021
External
Internal
Overview
The BFS algorithm as described above can be used, with a very small constant-time addition, to keep track of the layer each newly discovered node is in, relative to the start node, and that will automatically indicate the shortest path between the start node s and a reachable node v.
⚠️ Only breadth-first search gives the guarantee of the shortest path.
Algorithm
The algorithm is (differences to the canonical BFS algorithm are emphasized):
BFS_with_Shortest_Path(graph G, start vertex s)
# All nodes are assumed unexplored
initialize a Queue Q (FIFO)
mark s as explored
annotate s with distance 0
place s in Q
while Q has elements
remove the head of the queue v
for each edge (v, w):
if w unexplored:
mark w as explored
annotate w with a distance dist(w) = dist(v) + 1
add w to Q
The distance computed on reachable node gives the "layer" and the distance from the start node s.
