题面

luogu

题解

数据范围已经告诉我们是虚树了,考虑如何在虚树上面\(dp\)

以下摘自hzwer博客:

构建虚树以后两遍dp处理出虚树上每个点最近的议事处

然后枚举虚树上每一条边，考虑其对两端点的答案贡献

可以用倍增二分出分界点

如果a，b的分界点为mid，a，b路径上a的第一个儿子为x

则对a的贡献是size[x]-size[mid]

对b的贡献是size[mid]-size[b]

还要算上没被考虑的点

Code

// luogu-judger-enable-o2

#include<bits/stdc++.h>

#define LL long long

#define RG register

using namespace std;

template<class T> inline void read(T &x) {

	x = 0; RG char c = getchar(); bool f = 0;

	while (c != '-' && (c < '0' || c > '9')) c = getchar(); if (c == '-') c = getchar(), f = 1;

	while (c >= '0' && c <= '9') x = x*10+c-48, c = getchar();

	x = f ? -x : x;

	return ;

}

template<class T> inline void write(T x) {

	if (!x) {putchar(48);return ;}

	if (x < 0) x = -x, putchar('-');

	int len = -1, z[20]; while (x > 0) z[++len] = x%10, x /= 10;

	for (RG int i = len; i >= 0; i--) putchar(z[i]+48);return ;

}

int n;

const int N = 300010;

struct node {

	int to, next;

}g[N<<1];

int last[N], gl;

inline void add(int x, int y) {

	g[++gl] = (node) {y, last[x]};

	last[x] = gl;

	return ;

}

int dfn[N], cnt, siz[N], dep[N], anc[N][21], rem[N], bel[N];

void init(int u, int fa) {

	dfn[u] = ++cnt; siz[u] = 1;

	anc[u][0] = fa;

	for (int i = 1; i <= 20; i++)

		anc[u][i] = anc[anc[u][i-1]][i-1];

	for (int i = last[u]; i; i = g[i].next) {

		int v = g[i].to;

		if (v == fa) continue;

		dep[v] = dep[u]+1;

		init(v, u);

		siz[u] += siz[v];

	}

	return ;

}

int lca(int x, int y) {

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

	for (int i = 20; i >= 0; i--)

		if (dep[x]-(1<<i) >= dep[y])

			x = anc[x][i];

	if (x == y) return x;

	for (int i = 20; i >= 0; i--)

		if (anc[x][i] != anc[y][i])

			x = anc[x][i], y = anc[y][i];

	return anc[x][0];

}

int dis(int x, int y) {

	return dep[x]+dep[y]-2*dep[lca(x, y)];

}

int top, len, m, a[N], b[N], s[N], c[N], f[N];

bool cmp(int a, int b) {

	return dfn[a] < dfn[b];

}

inline void insert(int x) {

	if (top == 1) {s[++top] = x; return ;}

	int o = lca(x, s[top]);

	while (top > 1 && dfn[s[top-1]] >= dfn[o]) add(s[top-1], s[top]), top--;

	if (o != s[top]) add(o, s[top]), s[top] = o;

	s[++top] = x;

	return ;

}

void dfs1(int x) {

	c[++len] = x; rem[x] = siz[x];

	for (int i = last[x]; i; i = g[i].next) {

		dfs1(g[i].to);

		if (!bel[g[i].to]) continue;

		int t1 = dis(bel[g[i].to], x), t2 = dis(bel[x], x);

		if ((t1 == t2 && bel[g[i].to] < bel[x]) || t1 < t2 || !bel[x])

			bel[x] = bel[g[i].to];

	}

	return ;

}

void dfs2(int x) {

	for (int i = last[x]; i; i = g[i].next) {

		int t1 = dis(bel[x], g[i].to), t2 = dis(bel[g[i].to], g[i].to);

		if ((t1 == t2 && bel[g[i].to] > bel[x]) || t1 < t2 || !bel[g[i].to])

			bel[g[i].to] = bel[x];

		dfs2(g[i].to);

	}

	return ;

}

void solve(int a, int b) {

	int x = b, mid = b;

	for (int i = 20; i >= 0; i--)

		if (dep[anc[x][i]] > dep[a])

			x = anc[x][i];

	rem[a] -= siz[x];

	if (bel[a] == bel[b]) {

		f[bel[a]] += siz[x]-siz[b];

		return ;

	}

	for (int i = 20; i >= 0; i--) {

		int nxt = anc[mid][i];

		if (dep[nxt] <= dep[a]) continue;

		int t1 = dis(bel[a], nxt), t2 = dis(bel[b], nxt);

		if (t1 > t2 || (t1 == t2 && bel[b] < bel[a])) mid = nxt;

	}

	f[bel[a]] += siz[x]-siz[mid];

	f[bel[b]] += siz[mid]-siz[b];

	return ;

}

void query() {

	top = len = gl = 0;

	read(m);

	for (int i = 1; i <= m; i++) read(a[i]), b[i] = a[i];

	for (int i = 1; i <= m; i++) bel[a[i]] = a[i];

	sort(a+1, a+1+m, cmp);

	if (bel[1] != 1) s[++top] = 1;

	for (int i = 1; i <= m; i++) insert(a[i]);

	for (int i = 1; i < top; i++) add(s[i], s[i+1]);

	dfs1(1); dfs2(1);

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

		for (int j = last[c[i]]; j; j = g[j].next)

			solve(c[i], g[j].to);

	for (int i = 1; i <= len; i++) f[bel[c[i]]] += rem[c[i]];

	for (int i = 1; i <= m; i++) write(f[b[i]]), putchar(' ');

	putchar('\n');

	for (int i = 1; i <= len; i++) f[c[i]] = bel[c[i]] = last[c[i]] = 0;

	return ;

}

int main() {

	read(n);

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

		int x, y;

		read(x); read(y);

		add(x, y); add(y, x);

	}

	init(1, 0);

	memset(last, 0, sizeof(last));

	int q; read(q);

	while (q--) query();

	return 0;

}