如何使用Python实现克鲁斯卡尔算法？

class Graph:
    def __init__(self, vertices):
        self.V = vertices  # 顶点数
        self.graph = []

    # 添加边
    def add_edge(self, u, v, weight):
        self.graph.append([u, v, weight])

    # 查找根节点
    def find(self, parent, i):
        if parent[i] == i:
            return i
        return self.find(parent, parent[i])

    # 合并集合
    def union(self, parent, rank, x, y):
        root_x = self.find(parent, x)
        root_y = self.find(parent, y)
        if rank[root_x] < rank[root_y]:
            parent[root_x] = root_y
        elif rank[root_x] > rank[root_y]:
            parent[root_y] = root_x
        else:
            parent[root_y] = root_x
            rank[root_x] += 1

    # 克鲁斯卡尔算法
    def kruskal_algorithm(self):
        result = []
        i = 0
        e = 0
        self.graph = sorted(self.graph, key=lambda item: item[2])  # 按照权值排序
        parent = []
        rank = []

        for node in range(self.V):
            parent.append(node)
            rank.append(0)

        while e < self.V - 1:
            u, v, weight = self.graph[i]
            i += 1
            x = self.find(parent, u)
            y = self.find(parent, v)

            if x != y:
                e += 1
                result.append([u, v, weight])
                self.union(parent, rank, x, y)

        # 打印最小生成树
        print("最小生成树：")
        for u, v, weight in result:
            print(f"{u} -- {v}     {weight}")

        # 计算最小生成树的总权值
        total_weight = sum(weight for u, v, weight in result)
        print("最小生成树的总权值：", total_weight)


if __name__ == '__main__':
    g = Graph(6)
    g.add_edge(0, 1, 4)
    g.add_edge(0, 2, 3)
    g.add_edge(1, 2, 1)
    g.add_edge(1, 3, 2)
    g.add_edge(2, 3, 4)
    g.add_edge(2, 4, 3)
    g.add_edge(3, 4, 2)
    g.add_edge(3, 5, 1)
    g.add_edge(4, 5, 6)

    g.kruskal_algorithm()