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88 lines
2.4 KiB
Python
88 lines
2.4 KiB
Python
class UnionFind():
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"""
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https://en.wikipedia.org/wiki/Disjoint-set_data_structure
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The union-find is a disjoint-set data structure
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You can merge two sets and tell if one set belongs to
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another one.
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It's used on the Kruskal Algorithm
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(https://en.wikipedia.org/wiki/Kruskal%27s_algorithm)
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The elements are in range [0, size]
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"""
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def __init__(self, size):
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if size <= 0:
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raise ValueError("size should be greater than 0")
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self.size = size
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# The below plus 1 is because we are using elements
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# in range [0, size]. It makes more sense.
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# Every set begins with only itself
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self.root = [i for i in range(size+1)]
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# This is used for heuristic union by rank
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self.weight = [0 for i in range(size+1)]
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def union(self, u, v):
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"""
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Union of the sets u and v.
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Complexity: log(n).
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Amortized complexity: < 5 (it's very fast).
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"""
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self._validate_element_range(u, "u")
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self._validate_element_range(v, "v")
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if u == v:
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return
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# Using union by rank will guarantee the
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# log(n) complexity
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rootu = self._root(u)
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rootv = self._root(v)
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weight_u = self.weight[rootu]
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weight_v = self.weight[rootv]
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if weight_u >= weight_v:
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self.root[rootv] = rootu
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if weight_u == weight_v:
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self.weight[rootu] += 1
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else:
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self.root[rootu] = rootv
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def same_set(self, u, v):
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"""
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Return true if the elements u and v belongs to
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the same set
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"""
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self._validate_element_range(u, "u")
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self._validate_element_range(v, "v")
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return self._root(u) == self._root(v)
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def _root(self, u):
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"""
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Get the element set root.
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This uses the heuristic path compression
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See wikipedia article for more details.
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"""
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if u != self.root[u]:
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self.root[u] = self._root(self.root[u])
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return self.root[u]
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def _validate_element_range(self, u, element_name):
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"""
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Raises ValueError if element is not in range
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"""
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if u < 0 or u > self.size:
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msg = ("element {0} with value {1} "
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"should be in range [0~{2}]")\
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.format(element_name, u, self.size)
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raise ValueError(msg)
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