forked from TheAlgorithms/Python
-
Notifications
You must be signed in to change notification settings - Fork 0
Commit
This commit does not belong to any branch on this repository, and may belong to a fork outside of the repository.
Added Tarjan's algorithm for finding strongly connected components
- Loading branch information
Showing
1 changed file
with
78 additions
and
0 deletions.
There are no files selected for viewing
This file contains bidirectional Unicode text that may be interpreted or compiled differently than what appears below. To review, open the file in an editor that reveals hidden Unicode characters.
Learn more about bidirectional Unicode characters
| Original file line number | Diff line number | Diff line change |
|---|---|---|
| @@ -0,0 +1,78 @@ | ||
| from collections import deque | ||
|
|
||
|
|
||
| def tarjan(g): | ||
| """ | ||
| Tarjan's algo for finding strongly connected components in a directed graph | ||
| Uses two main attributes of each node to track reachability, the index of that node within a component(index), | ||
| and the lowest index reachable from that node(lowlink). | ||
| We then perform a dfs of the each component making sure to update these parameters for each node and saving the | ||
| nodes we visit on the way. | ||
| If ever we find that the lowest reachable node from a current node is equal to the index of the current node then it | ||
| must be the root of a strongly connected component and so we save it and it's equireachable vertices as a strongly | ||
| connected component. | ||
| Complexity: strong_connect() is called at most once for each node and has a complexity of O(|E|) as it is DFS. | ||
| Therefore this has complexity O(|V| + |E|) for a graph G = (V, E) | ||
| """ | ||
|
|
||
| n = len(g) | ||
| stack = deque() | ||
| on_stack = [False for _ in range(n)] | ||
| index_of = [-1 for _ in range(n)] | ||
| lowlink_of = index_of[:] | ||
|
|
||
| def strong_connect(v, index, components): | ||
| index_of[v] = index # the number when this node is seen | ||
| lowlink_of[v] = index # lowest rank node reachable from here | ||
| index += 1 | ||
| stack.append(v) | ||
| on_stack[v] = True | ||
|
|
||
| for w in g[v]: | ||
| if index_of[w] == -1: | ||
| index = strong_connect(w, index, components) | ||
| lowlink_of[v] = lowlink_of[w] if lowlink_of[w] < lowlink_of[v] else lowlink_of[v] | ||
| elif on_stack[w]: | ||
| lowlink_of[v] = lowlink_of[w] if lowlink_of[w] < lowlink_of[v] else lowlink_of[v] | ||
|
|
||
| if lowlink_of[v] == index_of[v]: | ||
| component = [] | ||
| w = stack.pop() | ||
| on_stack[w] = False | ||
| component.append(w) | ||
| while w != v: | ||
| w = stack.pop() | ||
| on_stack[w] = False | ||
| component.append(w) | ||
| components.append(component) | ||
| return index | ||
|
|
||
| components = [] | ||
| for v in range(n): | ||
| if index_of[v] == -1: | ||
| strong_connect(v, 0, components) | ||
|
|
||
| return components | ||
|
|
||
|
|
||
| def create_graph(n, edges): | ||
| g = [[] for _ in range(n)] | ||
| for u, v in edges: | ||
| g[u].append(v) | ||
| return g | ||
|
|
||
|
|
||
| if __name__ == '__main__': | ||
| # Test | ||
| n_vertices = 7 | ||
| source = [0, 0, 1, 2, 3, 3, 4, 4, 6] | ||
| target = [1, 3, 2, 0, 1, 4, 5, 6, 5] | ||
| edges = [(u, v) for u, v in zip(source, target)] | ||
| g = create_graph(n_vertices, edges) | ||
|
|
||
| assert [[5], [6], [4], [3, 2, 1, 0]] == tarjan(g) |