"""
An implementation of Karger's Algorithm for partitioning a graph.
"""
from __future__ import annotations
import random
TEST_GRAPH = {
"1": ["2", "3", "4", "5"],
"2": ["1", "3", "4", "5"],
"3": ["1", "2", "4", "5", "10"],
"4": ["1", "2", "3", "5", "6"],
"5": ["1", "2", "3", "4", "7"],
"6": ["7", "8", "9", "10", "4"],
"7": ["6", "8", "9", "10", "5"],
"8": ["6", "7", "9", "10"],
"9": ["6", "7", "8", "10"],
"10": ["6", "7", "8", "9", "3"],
}
def partition_graph(graph: dict[str, list[str]]) -> set[tuple[str, str]]:
"""
Partitions a graph using Karger's Algorithm. Implemented from
pseudocode found here:
https://en.wikipedia.org/wiki/Karger%27s_algorithm.
This function involves random choices, meaning it will not give
consistent outputs.
Args:
graph: A dictionary containing adacency lists for the graph.
Nodes must be strings.
Returns:
The cutset of the cut found by Karger's Algorithm.
>>> graph = {'0':['1'], '1':['0']}
>>> partition_graph(graph)
{('0', '1')}
"""
contracted_nodes = {node: {node} for node in graph}
graph_copy = {node: graph[node][:] for node in graph}
while len(graph_copy) > 2:
u = random.choice(list(graph_copy.keys()))
v = random.choice(graph_copy[u])
uv = u + v
uv_neighbors = list(set(graph_copy[u] + graph_copy[v]))
uv_neighbors.remove(u)
uv_neighbors.remove(v)
graph_copy[uv] = uv_neighbors
for neighbor in uv_neighbors:
graph_copy[neighbor].append(uv)
contracted_nodes[uv] = set(contracted_nodes[u].union(contracted_nodes[v]))
del graph_copy[u]
del graph_copy[v]
for neighbor in uv_neighbors:
if u in graph_copy[neighbor]:
graph_copy[neighbor].remove(u)
if v in graph_copy[neighbor]:
graph_copy[neighbor].remove(v)
groups = [contracted_nodes[node] for node in graph_copy]
return {
(node, neighbor)
for node in groups[0]
for neighbor in graph[node]
if neighbor in groups[1]
}
if __name__ == "__main__":
print(partition_graph(TEST_GRAPH))