【题意分析】
给你一张无向图,要求支持删点和询问连通块数。
【解题思路】
可以直接可持久化并查集大力艹过去。
考虑到正着删点就是倒着加点,所以并不需要可持久化。复杂度O((k+m)α(n))。
【参考代码】
当时还在玩泥巴,实现有点naive,常数奇大无比。。
1 #include<cstdio>
2 #include<cstring>
3 #include<set>
4 #define REP(I,start,end) for(int I=start;I<=end;I++)
5 #define PER(I,start,end) for(int I=start;I>=end;I--)
6 using namespace std;
7 set<int> tree;
8 int n,m,k,edge=0,q[400001],father[400001],head[400001],next[400001],point[400001],sav[400001];
9 bool destroyed[400001];
10 inline void addEdge(int from,int to)
11 {
12 next[++edge]=head[from];
13 head[from]=edge;
14 point[edge]=to;
15 }
16 inline int getFa(int n)
17 {
18 if(father[n]==n)
19 return n;
20 return father[n]=getFa(father[n]);
21 }
22 int main()
23 {
24 scanf("%d%d",&n,&m);
25 REP(i,1,m)
26 {
27 int u,v;
28 scanf("%d%d",&u,&v);
29 addEdge(u,v);
30 addEdge(v,u);
31 }
32 scanf("%d",&k);
33 memset(destroyed,0,sizeof(destroyed));
34 REP(i,1,k)
35 {
36 scanf("%d",q+i);
37 destroyed[q[i]]=true;
38 }
39 REP(i,0,n-1)
40 father[i]=i;
41 REP(i,0,n-1)
42 if(!destroyed[i])
43 {
44 int t=head[i];
45 while(t)
46 {
47 int p=point[t];
48 if(!destroyed[p])
49 father[getFa(p)]=getFa(i);
50 t=next[t];
51 }
52 }
53 tree.clear();
54 REP(i,0,n-1)
55 {
56 int fa=getFa(i);
57 if(!destroyed[i]&&tree.find(fa)==tree.end())
58 tree.insert(fa);
59 }
60 sav[k]=tree.size();
61 PER(i,k-1,0)
62 {
63 int P=q[i+1],t=head[P];
64 destroyed[P]=false;
65 tree.clear();
66 while(t)
67 {
68 int p=point[t];
69 if(!destroyed[p])
70 {
71 int fa2=getFa(p);
72 tree.insert(fa2);
73 father[getFa(P)]=fa2;
74 }
75 t=next[t];
76 }
77 sav[i]=sav[i+1]-tree.size()+1;
78 }
79 REP(i,0,k)
80 printf("%d\n",sav[i]);
81 return 0;
82 }
时间: 2024-10-21 18:12:05