题目:无环树求所有路径最大值的和笔试的时候没写出来,想到了边权按贡献算,但只写了个暴力20%。正解:并查集每个点视为一个联通块,先按边权从小到大排序,逐个加入边。联通块里的值肯定都小于当前边权,那么左右联通块大小就分别代表边左右两侧的节点数,相乘就是路径数。所以贡献 = 左边连通块大小 × 右边连通块大小 × 边权。代码如下struct edge {int u, v, w;edge(int u = 0, int v = 0, int w = 0) : u(u), v(v), w(w) {}bool operator<(const edge &other) const { return w < other.w; }};ll res = 0, n;vector<edge> e;int fa[N], sz[N];int find(int x) { return fa[x] = ((fa[x] == x) ? x : find(fa[x])); }void unite(int x, int y) {int rx = find(x), ry = find(y);if (rx == ry)return;if (sz[rx] < sz[ry])swap(rx, ry);fa[ry] = rx, sz[rx] += sz[ry];}void solve() {cin >> n;for (int i = 1; i < n; i++) {int u, v, w;cin >> u >> v >> w;e.emplace_back(u, v, w);}for (int i = 1; i <= n; i++) {fa[i] = i, sz[i] = 1;}sort(e.begin(), e.end());for (const auto &e : e) {int ru = find(e.u);int rv = find(e.v);if (ru != rv) {// 贡献 = 左边连通块大小 × 右边连通块大小 × 边权res = (res + (ll)sz[ru] * sz[rv] % mod * e.w % mod) % mod;unite(e.u, e.v);}}cout << res << endl;}
是kpi了吗
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