[Luogu 3258] JLOI2014 松鼠的新家

<题目链接>

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LCA + 树上差分。

我呢，因为是树剖求的 LCA，预处理了 DFN（DFS 序），于是简化成了序列差分。

qwq不讲了不讲了，贴代码。

#include <algorithm>

#include <cstdio>

#include <cstring>

#define nullptr NULL

const int MAXN = 300010; 

int n, a[MAXN]; 

namespace HLD

{

    int qwq[MAXN];

    class Graph

    {

        private:

            bool vis[MAXN];

            int num;

            struct Node

            {

                int depth, size, father, son, top, DFN;

            }s[MAXN];

            struct Edge

            {

                int to;

                Edge *next;

                Edge(int to, Edge* next): to(to), next(next){}

                ~Edge(void)

                {

                    if(next!=nullptr)

                        delete next;

                }

            }*head[MAXN];

            void Modify(int l, int r, int k)

            {

                qwq[s[l].DFN] += k;

                qwq[s[r].DFN + 1] -= k;

            }

            void Add(int x, int y)

            {

                int a, b;

                while((a = s[x].top) ^ (b = s[y].top))

                    if(s[a].depth > s[b].depth)

                    {

                        Modify(a, x, 1);

                        x = s[a].father;

                    }

                    else

                    {

                        Modify(b, y, 1);

                        y = s[b].father;

                    }

                if(s[x].depth < s[y].depth)

                    Modify(x, y, 1);

                else

                    Modify(y, x, 1);

            }

        public:

            Graph(int n): num(0)

            {

                memset(vis, 0, sizeof vis);

                memset(s, 0, sizeof s);

                std :: fill(head + 1, head + n + 1, (Edge*)nullptr);

            }

            ~Graph(void)

            {

                for(int i = 1; i <= n; ++i)

                    delete head[i];

            }

            void AddEdges(int u, int v)

            {

                head[u] = new Edge(v, head[u]);

                head[v] = new Edge(u, head[v]);

            }

            void DFS1(int u, int k)

            {

                s[u].depth = k;

                s[u].size = 1;

                int v;

                for(Edge* i = head[u]; i != nullptr; i = i -> next)

                    if(!s[v = i -> to].depth)

                    {

                        DFS1(v, k + 1);

                        s[v].father = u;

                        s[u].size += s[v].size;

                        if(s[v].size > s[s[u].son].size)

                            s[u].son = v;

                    }

            }

            void DFS2(int u, int top)

            {

                s[u].top = top;

                s[u].DFN = ++num;

                vis[u] = true;

                if(s[u].son)

                    DFS2(s[u].son, top);

                int v;

                for(Edge* i = head[u]; i != nullptr; i = i -> next)

                    if(!vis[v = i -> to])

                        DFS2(v, v);

            }

            void Walk(int x, int y)

            {

                Add(x, y);

                Modify(y, y, -1);

            }

            void Find(void)

            {

                for(int i = 1; i < n; ++i)

                    qwq[i + 1] += qwq[i];

                for(int i = 1; i <= n; ++i)

                    printf("%d\n", qwq[s[i].DFN]);

            }

    }*G;

    void Init(void)

    {

        G = new Graph(n);

        for(int i = 1, u, v; i < n; ++i)

        {

            scanf("%d %d", &u, &v);

            G -> AddEdges(u, v);

        }

        G -> DFS1(1, 1);

        G -> DFS2(1, 1);

    }

}

int main(void)

{

    scanf("%d", &n);

    for(int i = 1; i <= n; ++i)

        scanf("%d", &a[i]);

    HLD :: Init();

    for(int i = 1; i < n; ++i)

        HLD :: G -> Walk(a[i], a[i + 1]);

    HLD :: G -> Find();

    return 0;

}

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谢谢阅读。