树上差分

这应该是一道很简单的树上差分了。。就是问每个点被覆盖了多少次。

要注意我们最后dfs后，要把除第一个节点以外的所有点的-1，因为有些点作为起点和终点覆盖了两次，按照题目意思是不用覆盖两次的。

#include <bits/stdc++.h>

#define INF 0x3f3f3f3f

#define full(a, b) memset(a, b, sizeof a)

using namespace std;

typedef long long ll;

inline int lowbit(int x){ return x & (-x); }

inline int read(){

    int X = 0, w = 0; char ch = 0;

    while(!isdigit(ch)) { w |= ch == '-'; ch = getchar(); }

    while(isdigit(ch)) X = (X << 3) + (X << 1) + (ch ^ 48), ch = getchar();

    return w ? -X : X;

}

inline int gcd(int a, int b){ return a % b ? gcd(b, a % b) : b; }

inline int lcm(int a, int b){ return a / gcd(a, b) * b; }

template<typename T>

inline T max(T x, T y, T z){ return max(max(x, y), z); }

template<typename T>

inline T min(T x, T y, T z){ return min(min(x, y), z); }

template<typename A, typename B, typename C>

inline A fpow(A x, B p, C lyd){

    A ans = 1;

    for(; p; p >>= 1, x = 1LL * x * x % lyd)if(p & 1)ans = 1LL * x * ans % lyd;

    return ans;

}

const int N = 300005;

int n, s[N], cnt, head[N], depth[N], p[N][20], t, val[N];

bool vis[N];

struct Edge { int v, next; }edge[N<<1];

void addEdge(int a, int b){

    edge[cnt].v = b, edge[cnt].next = head[a], head[a] = cnt ++;

}

void dfs(int s, int fa){

    depth[s] = depth[fa] + 1;

    p[s][0] = fa;

    for(int i = 1; i <= t; i ++){

        p[s][i] = p[p[s][i - 1]][i - 1];

    }

    for(int i = head[s]; i != -1; i = edge[i].next){

        int u = edge[i].v;

        if(u == fa) continue;

        dfs(u, s);

    }

}

int lca(int x, int y){

    if(depth[x] < depth[y]) swap(x, y);

    for(int i = t; i >= 0; i --){

        if(depth[p[x][i]] >= depth[y]) x = p[x][i];

    }

    if(x == y) return y;

    for(int i = t; i >= 0; i --){

        if(p[x][i] != p[y][i]) x = p[x][i], y = p[y][i];

    }

    return p[y][0];

}

void dfs(int s){

    vis[s] = true;

    for(int i = head[s]; i != -1; i = edge[i].next){

        int u = edge[i].v;

        if(vis[u]) continue;

        dfs(u);

        val[s] += val[u];

    }

}

int main(){

    full(head, -1);

    n = read();

    for(int i = 0; i < n; i ++) s[i] = read();

    for(int i = 0; i < n - 1; i ++){

        int u = read(), v = read();

        addEdge(u, v), addEdge(v, u);

    }

    t = (int)(log(n) / log(2)) + 1;

    dfs(s[0], 0);

    for(int i = 0; i < n - 1; i ++){

        val[s[i]] ++, val[s[i + 1]] ++;

        int f = lca(s[i], s[i + 1]);

        val[f] --, val[p[f][0]] --;

    }

    dfs(s[0]);

    for(int i = 1; i < n; i ++) val[s[i]] --;

    for(int i = 1; i <= n; i ++) printf("%d\n", val[i]);

    return 0;

}