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  • 2020牛客多校第十场J-Identical Trees

    https://ac.nowcoder.com/acm/contest/5675/J

    题意

    给出两棵同构的树,问最少修改多少点,让两棵树相同,即根节点相同,非根节点父亲节点的编号相同。

    题解

    (dp[u1][u2])(tree1)的子树根节点为(u1)(tree2)的子树根节点为(u2),子树中最多能匹配的点。

    我们先对树做一遍hash,方便判断哪些子树是同构的。

    按sz从小到大枚举两颗树的子树,如果同构,就计算这两棵子树匹配,最多有多少节点可以相同。

    对于这两棵子树的同构子树,用一张图记录i和j子树之间匹配的答案,即(G[i][j]=dp[v1[i]][v2[j]])用KM算法进行转移,算出最大的匹配值,再加上根节点是否相同,就是这两棵子树匹配的答案,由于是按sz从小到大枚举,子树的子树匹配答案已经被计算出。

    最后答案即为(n-dp[t1.rt][t2.rt])

    代码

    #include <bits/stdc++.h>
    using namespace std;
    typedef long long ll;
    typedef unsigned long long ull;
    struct READ {
        inline char read() {
        #ifdef _WIN32
            return getchar();
        #endif
            static const int IN_LEN = 1 << 18 | 1;
            static char buf[IN_LEN], *s, *t;
            return (s == t) && (t = (s = buf) + fread(buf, 1, IN_LEN, stdin)), s == t ? -1 : *s++;
        }
        template <typename _Tp> inline READ & operator >> (_Tp&x) {
            static char c11, boo;
            for(c11 = read(),boo = 0; !isdigit(c11); c11 = read()) {
                if(c11 == -1) return *this;
                boo |= c11 == '-';
            }
            for(x = 0; isdigit(c11); c11 = read()) x = x * 10 + (c11 ^ '0');
            boo && (x = -x);
            return *this;
        }
    } in;
    
    const int N = 505;
    #define pii pair<int, int>
    mt19937_64 rdn(time(0));
    int n;
    ull key[N];
    struct tree {
        ull hs[N];
        int sz[N];
        vector<int> G[N];
        int rt = 0;
        vector<pii> f;
        void read() {
            for (int i = 1; i <= n; i++) {
                int x; in >> x;
                if (x == 0) rt = i;
                else {
                    G[i].push_back(x);
                    G[x].push_back(i);
                }
            }
            dfs(rt, 0);
            for (int i = 1; i <= n; i++) f.push_back(pii(sz[i], i));
            sort(f.begin(), f.end());
        }
        void dfs(int u, int fa) {
            sz[u] = 1;
            hs[u] = key[sz[u]];
            for (int v : G[u]) {
                if (v == fa) continue;
                dfs(v, u);
                sz[u] += sz[v];
                hs[u] += key[sz[v]] * hs[v];
            }
        }
    } t1, t2;
    struct KM {
        int G[N][N];
        bool visx[N], visy[N];
        int lx[N], ly[N];
        int slack[N];
        int linker[N];
        int pre[N];
        const int inf = 1e9 + 50;
        int n;
        void bfs(int k) {
            int x, y = 0, yy = 0, delta;
            memset(pre, 0, sizeof(pre));
            fill(slack + 1, slack + n + 1, inf);
            linker[y] = k;
            while (1) {
                x = linker[y]; delta = inf; visy[y] = true;
                for (int i = 1; i <= n; i++) {
                    if (!visy[i]) {
                        if (slack[i] > lx[x] + ly[i] - G[x][i]) {
                            slack[i] = lx[x] + ly[i] - G[x][i];
                            pre[i] = y;
                        }
                        if (slack[i] < delta) delta = slack[i], yy = i;
                    }
                }
                for (int i = 0; i <= n; i++) {
                    if (visy[i]) lx[linker[i]] -= delta, ly[i] += delta;
                    else slack[i] -= delta;
                }
                y = yy;
                if (linker[y] == -1) break;
            }
            while (y) linker[y] = linker[pre[y]], y = pre[y];
        }
        int calc(int nn) {
            n = nn;
            for (int i = 1; i <= n; i++) {
                lx[i] = ly[i] = 0;
                linker[i] = -1;
            }
            // for (int i = 1; i <= n; i++) {
            //     for (int j = 1; j <= n; j++) {
            //         printf("%d ", G[i][j]);
            //     }
            //     puts("");
            // }
            for (int i = 1; i <= n; i++) {
                memset(visy, false, sizeof(visy));
                bfs(i);
            }
            int ans = 0;
            for (int i = 1; i <= n; i++) {
                if (linker[i]) ans += G[linker[i]][i];
            }
            return ans;
        }
        
    } km;
    int dp[N][N];
    int main() {
        in >> n;
        for (int i = 0; i <= n; i++) key[i] = rdn();
        t1.read(); t2.read();
        for (auto x : t1.f) {
            for (auto y : t2.f) {
                int u1 = x.second, u2 = y.second;
                if (t1.hs[u1] == t2.hs[u2]) {
                    set<ull> val;
                    map<ull, vector<int>> m1, m2;
                    for (int v1 : t1.G[u1]) val.insert(t1.hs[v1]), m1[t1.hs[v1]].push_back(v1);
                    for (int v2 : t2.G[u2]) m2[t2.hs[v2]].push_back(v2);
                    int ans = 0;
                    for (ull v : val) {
                        auto v1 = m1[v], v2 = m2[v];
                        for (int i = 0; i < v1.size(); i++) {
                            for (int j = 0; j < v2.size(); j++) {
                                km.G[i+1][j+1] = dp[v1[i]][v2[j]];
                            }
                        }
                        ans += km.calc(v1.size());
                    }
                    dp[u1][u2] = ans + (u1 == u2);
                    //printf("%d %d %d %d
    ", u1, u2, ans, dp[u1][u2]);
                }
    
            }
        }
        printf("%d
    ", n - dp[t1.rt][t2.rt]);
        return 0;
    }
    
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  • 原文地址:https://www.cnblogs.com/artoriax/p/13648967.html
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