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153 lines
3.4 KiB
Python
153 lines
3.4 KiB
Python
"""Prim's Algorithm.
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Determines the minimum spanning tree(MST) of a graph using the Prim's Algorithm.
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Details: https://en.wikipedia.org/wiki/Prim%27s_algorithm
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"""
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import heapq as hq
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import math
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from collections.abc import Iterator
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class Vertex:
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"""Class Vertex."""
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def __init__(self, id_):
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"""
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Arguments:
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id - input an id to identify the vertex
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Attributes:
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neighbors - a list of the vertices it is linked to
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edges - a dict to store the edges's weight
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"""
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self.id = str(id_)
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self.key = None
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self.pi = None
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self.neighbors = []
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self.edges = {} # {vertex:distance}
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def __lt__(self, other):
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"""Comparison rule to < operator."""
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return self.key < other.key
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def __repr__(self):
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"""Return the vertex id."""
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return self.id
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def add_neighbor(self, vertex):
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"""Add a pointer to a vertex at neighbor's list."""
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self.neighbors.append(vertex)
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def add_edge(self, vertex, weight):
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"""Destination vertex and weight."""
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self.edges[vertex.id] = weight
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def connect(graph, a, b, edge):
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# add the neighbors:
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graph[a - 1].add_neighbor(graph[b - 1])
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graph[b - 1].add_neighbor(graph[a - 1])
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# add the edges:
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graph[a - 1].add_edge(graph[b - 1], edge)
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graph[b - 1].add_edge(graph[a - 1], edge)
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def prim(graph: list, root: Vertex) -> list:
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"""Prim's Algorithm.
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Runtime:
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O(mn) with `m` edges and `n` vertices
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Return:
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List with the edges of a Minimum Spanning Tree
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Usage:
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prim(graph, graph[0])
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"""
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a = []
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for u in graph:
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u.key = math.inf
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u.pi = None
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root.key = 0
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q = graph[:]
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while q:
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u = min(q)
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q.remove(u)
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for v in u.neighbors:
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if (v in q) and (u.edges[v.id] < v.key):
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v.pi = u
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v.key = u.edges[v.id]
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for i in range(1, len(graph)):
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a.append((int(graph[i].id) + 1, int(graph[i].pi.id) + 1))
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return a
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def prim_heap(graph: list, root: Vertex) -> Iterator[tuple]:
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"""Prim's Algorithm with min heap.
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Runtime:
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O((m + n)log n) with `m` edges and `n` vertices
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Yield:
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Edges of a Minimum Spanning Tree
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Usage:
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prim(graph, graph[0])
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"""
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for u in graph:
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u.key = math.inf
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u.pi = None
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root.key = 0
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h = list(graph)
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hq.heapify(h)
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while h:
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u = hq.heappop(h)
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for v in u.neighbors:
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if (v in h) and (u.edges[v.id] < v.key):
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v.pi = u
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v.key = u.edges[v.id]
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hq.heapify(h)
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for i in range(1, len(graph)):
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yield (int(graph[i].id) + 1, int(graph[i].pi.id) + 1)
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def test_vector() -> None:
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"""
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# Creates a list to store x vertices.
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>>> x = 5
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>>> G = [Vertex(n) for n in range(x)]
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>>> connect(G, 1, 2, 15)
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>>> connect(G, 1, 3, 12)
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>>> connect(G, 2, 4, 13)
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>>> connect(G, 2, 5, 5)
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>>> connect(G, 3, 2, 6)
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>>> connect(G, 3, 4, 6)
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>>> connect(G, 0, 0, 0) # Generate the minimum spanning tree:
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>>> G_heap = G[:]
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>>> MST = prim(G, G[0])
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>>> MST_heap = prim_heap(G, G[0])
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>>> for i in MST:
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... print(i)
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(2, 3)
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(3, 1)
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(4, 3)
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(5, 2)
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>>> for i in MST_heap:
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... print(i)
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(2, 3)
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(3, 1)
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(4, 3)
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(5, 2)
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"""
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if __name__ == "__main__":
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import doctest
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doctest.testmod()
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