n vertices. Each vertex is a reservoir which can be either empty or filled with water.
The vertices of the tree are numbered from 1 to n with the root at vertex 1. For each vertex, the reservoirs of its children are located below the reservoir of this vertex, and the vertex is connected with each of the
children by a pipe through which water can flow downwards.
Mike wants to do the following operations with the tree:
- Fill vertex v with water. Then
v and all its children are filled with water. - Empty vertex v. Then
v and all its ancestors are emptied. - Determine whether vertex v is filled with water at the moment.
Initially all vertices of the tree are empty.
Mike has already compiled a full list of operations that he wants to perform in order. Before experimenting with the tree Mike decided to run the list through a simulation. Help Mike determine what results will he get after performing all the operations.
The first line of the input contains an integer n (1 ≤ n ≤ 500000) — the number of vertices in the tree. Each of the following
n - 1 lines contains two space-separated numbers
ai,
bi (1 ≤ ai, bi ≤ n,
ai ≠ bi) — the edges of the tree.
The next line contains a number q (1 ≤ q ≤ 500000) — the number of operations to perform. Each of the following
q lines contains two space-separated numbers
ci (1 ≤ ci ≤ 3),
vi (1 ≤ vi ≤ n), where
ci is the operation type (according to the numbering given in the statement), and
vi is the vertex on which the operation is performed.
It is guaranteed that the given graph is a tree.
For each type 3 operation print 1 on a separate line if the vertex is full, and 0 if the vertex is empty. Print the answers to queries in the order in which the queries are given in the input.
5
1 2
5 1
2 3
4 2
12
1 1
2 3
3 1
3 2
3 3
3 4
1 2
2 4
3 1
3 3
3 4
3 5
0
0
0
1
0
1
0
1
感觉好神奇的方法,用俩数组表示出一棵树;
#include <bits/stdc++.h>
using namespace std;
const int mx = 5e5 + 5; vector<int> g[mx];
set<int> Empty;
int L[mx], R[mx], fa[mx];
int timer, to; void dfs(int v, int p = -1)
{
L[v] = ++timer;
for (int i = 0; i < g[v].size(); ++i)
if ((to = g[v][i]) != p)
fa[to] = v, dfs(to, v);
R[v] = timer;
if (R[v] == L[v]) Empty.insert(L[v]);
} bool empty(int v)
{
set<int>::iterator it = Empty.lower_bound(L[v]);
return it != Empty.end() && *it <= R[v];
} void display()
{
set<int>::const_iterator p;
for (p = Empty.begin(); p != Empty.end(); ++p)
cout << *p << " ";
cout << "\n";
} int main()
{
int n, q, a, b, op, v;
scanf("%d", &n);
for(int i=1;i<n;i++)
{
scanf("%d%d", &a, &b);
g[a].push_back(b), g[b].push_back(a);
} //存储树
dfs(1);
// display();
scanf("%d", &q);
while (q--)
{
scanf("%d%d", &op, &v);
if (op == 1)
{
if (fa[v] && empty(fa[v])) Empty.insert(L[fa[v]]);
Empty.erase(Empty.lower_bound(L[v]), Empty.upper_bound(R[v]));
}
else if (op == 2) Empty.insert(L[v]);
else puts(empty(v) ? "0" : "1");
//display();
}
return 0;
}
版权声明:本文为博主原创文章,未经博主允许不得转载。