mirror of
https://github.com/TheAlgorithms/Python.git
synced 2024-12-18 01:00:15 +00:00
20e98fcded
* fix assignment of a variable to itself * Fix unnecessary 'else' clause in loop * formatting and redundant reasignment fix * mark unreachable code with a TODO comment * fix variable defined multiple times * fix static method without static decorator * revert unintended autoformatting Co-authored-by: Christian Clauss <cclauss@me.com> * revert autoformatting issue * applied black autoformatting Co-authored-by: Christian Clauss <cclauss@me.com>
197 lines
5.8 KiB
Python
197 lines
5.8 KiB
Python
class Graph:
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"""
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Data structure to store graphs (based on adjacency lists)
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"""
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def __init__(self):
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self.num_vertices = 0
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self.num_edges = 0
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self.adjacency = {}
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def add_vertex(self, vertex):
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"""
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Adds a vertex to the graph
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"""
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if vertex not in self.adjacency:
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self.adjacency[vertex] = {}
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self.num_vertices += 1
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def add_edge(self, head, tail, weight):
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"""
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Adds an edge to the graph
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"""
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self.add_vertex(head)
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self.add_vertex(tail)
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if head == tail:
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return
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self.adjacency[head][tail] = weight
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self.adjacency[tail][head] = weight
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def distinct_weight(self):
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"""
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For Boruvks's algorithm the weights should be distinct
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Converts the weights to be distinct
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"""
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edges = self.get_edges()
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for edge in edges:
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head, tail, weight = edge
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edges.remove((tail, head, weight))
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for i in range(len(edges)):
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edges[i] = list(edges[i])
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edges.sort(key=lambda e: e[2])
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for i in range(len(edges) - 1):
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if edges[i][2] >= edges[i + 1][2]:
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edges[i + 1][2] = edges[i][2] + 1
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for edge in edges:
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head, tail, weight = edge
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self.adjacency[head][tail] = weight
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self.adjacency[tail][head] = weight
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def __str__(self):
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"""
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Returns string representation of the graph
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"""
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string = ""
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for tail in self.adjacency:
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for head in self.adjacency[tail]:
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weight = self.adjacency[head][tail]
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string += "%d -> %d == %d\n" % (head, tail, weight)
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return string.rstrip("\n")
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def get_edges(self):
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"""
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Returna all edges in the graph
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"""
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output = []
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for tail in self.adjacency:
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for head in self.adjacency[tail]:
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output.append((tail, head, self.adjacency[head][tail]))
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return output
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def get_vertices(self):
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"""
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Returns all vertices in the graph
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"""
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return self.adjacency.keys()
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@staticmethod
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def build(vertices=None, edges=None):
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"""
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Builds a graph from the given set of vertices and edges
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"""
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g = Graph()
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if vertices is None:
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vertices = []
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if edges is None:
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edge = []
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for vertex in vertices:
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g.add_vertex(vertex)
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for edge in edges:
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g.add_edge(*edge)
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return g
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class UnionFind(object):
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"""
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Disjoint set Union and Find for Boruvka's algorithm
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"""
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def __init__(self):
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self.parent = {}
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self.rank = {}
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def __len__(self):
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return len(self.parent)
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def make_set(self, item):
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if item in self.parent:
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return self.find(item)
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self.parent[item] = item
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self.rank[item] = 0
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return item
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def find(self, item):
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if item not in self.parent:
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return self.make_set(item)
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if item != self.parent[item]:
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self.parent[item] = self.find(self.parent[item])
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return self.parent[item]
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def union(self, item1, item2):
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root1 = self.find(item1)
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root2 = self.find(item2)
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if root1 == root2:
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return root1
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if self.rank[root1] > self.rank[root2]:
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self.parent[root2] = root1
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return root1
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if self.rank[root1] < self.rank[root2]:
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self.parent[root1] = root2
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return root2
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if self.rank[root1] == self.rank[root2]:
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self.rank[root1] += 1
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self.parent[root2] = root1
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return root1
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@staticmethod
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def boruvka_mst(graph):
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"""
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Implementation of Boruvka's algorithm
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>>> g = Graph()
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>>> g = Graph.build([0, 1, 2, 3], [[0, 1, 1], [0, 2, 1],[2, 3, 1]])
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>>> g.distinct_weight()
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>>> bg = Graph.boruvka_mst(g)
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>>> print(bg)
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1 -> 0 == 1
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2 -> 0 == 2
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0 -> 1 == 1
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0 -> 2 == 2
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3 -> 2 == 3
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2 -> 3 == 3
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"""
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num_components = graph.num_vertices
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union_find = Graph.UnionFind()
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mst_edges = []
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while num_components > 1:
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cheap_edge = {}
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for vertex in graph.get_vertices():
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cheap_edge[vertex] = -1
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edges = graph.get_edges()
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for edge in edges:
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head, tail, weight = edge
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edges.remove((tail, head, weight))
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for edge in edges:
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head, tail, weight = edge
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set1 = union_find.find(head)
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set2 = union_find.find(tail)
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if set1 != set2:
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if cheap_edge[set1] == -1 or cheap_edge[set1][2] > weight:
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cheap_edge[set1] = [head, tail, weight]
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if cheap_edge[set2] == -1 or cheap_edge[set2][2] > weight:
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cheap_edge[set2] = [head, tail, weight]
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for vertex in cheap_edge:
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if cheap_edge[vertex] != -1:
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head, tail, weight = cheap_edge[vertex]
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if union_find.find(head) != union_find.find(tail):
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union_find.union(head, tail)
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mst_edges.append(cheap_edge[vertex])
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num_components = num_components - 1
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mst = Graph.build(edges=mst_edges)
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return mst
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