核心思想:把树的结构变成链式,用线段树或者其他来处理问题
做法:利用dfs来把树重新标号,每个非叶节点有一个重儿子,对于修改整棵子树的问题:因为新标号是dfs序的所以一定是一段区间,对于修改链的利用类似lca的方式每次将深度较大的节点搞到它重链的头上,并且处理该段重链,直到两个节点到同一重链上即可
#include <iostream>
#include <cstring>
#include <algorithm>
using namespace std;
typedef long long LL;
const int N = 100010, M = N * 2;
int n, m;
int w[N], h[N], e[M], ne[M], idx;
int id[N], nw[N], cnt;
int dep[N], sz[N], top[N], fa[N], son[N];
struct Tree
{
int l, r;
LL add, sum;
}tr[N * 4];
void add(int a, int b)
{
e[idx] = b, ne[idx] = h[a], h[a] = idx ++ ;
}
void dfs1(int u, int father, int depth)
{
dep[u] = depth, fa[u] = father, sz[u] = 1;
for (int i = h[u]; ~i; i = ne[i])
{
int j = e[i];
if (j == father) continue;
dfs1(j, u, depth + 1);
sz[u] += sz[j];
if (sz[son[u]] < sz[j]) son[u] = j;
}
}
void dfs2(int u, int t)
{
id[u] = ++ cnt, nw[cnt] = w[u], top[u] = t;
if (!son[u]) return;
dfs2(son[u], t);
for (int i = h[u]; ~i; i = ne[i])
{
int j = e[i];
if (j == fa[u] || j == son[u]) continue;
dfs2(j, j);
}
}
void pushup(int u)
{
tr[u].sum = tr[u << 1].sum + tr[u << 1 | 1].sum;
}
void pushdown(int u)
{
auto &root = tr[u], &left = tr[u << 1], &right = tr[u << 1 | 1];
if (root.add)
{
left.add += root.add, left.sum += root.add * (left.r - left.l + 1);
right.add += root.add, right.sum += root.add * (right.r - right.l + 1);
root.add = 0;
}
}
void build(int u, int l, int r)
{
tr[u] = {l, r, 0, nw[r]};
if (l == r) return;
int mid = l + r >> 1;
build(u << 1, l, mid), build(u << 1 | 1, mid + 1, r);
pushup(u);
}
void update(int u, int l, int r, int k)
{
if (l <= tr[u].l && r >= tr[u].r)
{
tr[u].add += k;
tr[u].sum += k * (tr[u].r - tr[u].l + 1);
return;
}
pushdown(u);
int mid = tr[u].l + tr[u].r >> 1;
if (l <= mid) update(u << 1, l, r, k);
if (r > mid) update(u << 1 | 1, l, r, k);
pushup(u);
}
LL query(int u, int l, int r)
{
if (l <= tr[u].l && r >= tr[u].r) return tr[u].sum;
pushdown(u);
int mid = tr[u].l + tr[u].r >> 1;
LL res = 0;
if (l <= mid) res += query(u << 1, l, r);
if (r > mid) res += query(u << 1 | 1, l, r);
return res;
}
void update_path(int u, int v, int k)
{
while (top[u] != top[v])
{
if (dep[top[u]] < dep[top[v]]) swap(u, v);
update(1, id[top[u]], id[u], k);
u = fa[top[u]];
}
if (dep[u] < dep[v]) swap(u, v);
update(1, id[v], id[u], k);
}
LL query_path(int u, int v)
{
LL res = 0;
while (top[u] != top[v])
{
if (dep[top[u]] < dep[top[v]]) swap(u, v);
res += query(1, id[top[u]], id[u]);
u = fa[top[u]];
}
if (dep[u] < dep[v]) swap(u, v);
res += query(1, id[v], id[u]);
return res;
}
void update_tree(int u, int k)
{
update(1, id[u], id[u] + sz[u] - 1, k);
}
LL query_tree(int u)
{
return query(1, id[u], id[u] + sz[u] - 1);
}
int main()
{
scanf("%d", &n);
for (int i = 1; i <= n; i ++ ) scanf("%d", &w[i]);
memset(h, -1, sizeof h);
for (int i = 0; i < n - 1; i ++ )
{
int a, b;
scanf("%d%d", &a, &b);
add(a, b), add(b, a);
}
dfs1(1, -1, 1);
dfs2(1, 1);
build(1, 1, n);
scanf("%d", &m);
while (m -- )
{
int t, u, v, k;
scanf("%d%d", &t, &u);
if (t == 1)
{
scanf("%d%d", &v, &k);
update_path(u, v, k);
}
else if (t == 2)
{
scanf("%d", &k);
update_tree(u, k);
}
else if (t == 3)
{
scanf("%d", &v);
printf("%lld
", query_path(u, v));
}
else printf("%lld
", query_tree(u));
}
return 0;
}