整体二分+树状数组
整体二分……感谢zyf提供的入门题
简单粗暴的做法:枚举每一个国家,二分他的$w_i$,然后计算……然而这样效率很低……
整体二分就是:对所有的国家一起进行二分,$w_i$在mid之前的,进左边,否则进右边(是不是很像线段树呀~其实就是吧……
其实感觉代码写起来也跟线段树有些相似?
RE:我没有在结束的时候加if (L==R) return;这样的话,只靠开头的 if (!V[o].size()) return;当极限数据的时候,走到叶子再乘二的话,就超出4*N的范围了……就跑到外面去了……所以就RE了……
1 /************************************************************** 2 Problem: 2527 3 User: Tunix 4 Language: C++ 5 Result: Accepted 6 Time:17700 ms 7 Memory:56832 kb 8 ****************************************************************/ 9 10 //BZOJ 2527 11 #include<cstdio> 12 #include<vector> 13 #include<cstring> 14 #include<cstdlib> 15 #include<iostream> 16 #include<algorithm> 17 #define rep(i,n) for(int i=0;i<n;++i) 18 #define F(i,j,n) for(int i=j;i<=n;++i) 19 #define D(i,j,n) for(int i=j;i>=n;--i) 20 #define pb push_back 21 using namespace std; 22 typedef long long LL; 23 inline int getint(){ 24 int r=1,v=0; char ch=getchar(); 25 for(;!isdigit(ch);ch=getchar()) if (ch=='-') r=-1; 26 for(; isdigit(ch);ch=getchar()) v=v*10-'0'+ch; 27 return r*v; 28 } 29 const int N=3e5+10; 30 /*******************template********************/ 31 32 33 int n,m,K,p[N],l[N],r[N],a[N],ans[N],tot; 34 vector<int>G[N],V[N<<2]; 35 LL c[N]; 36 void add(int x,LL v){ 37 for(;x<=m;x+=x&(-x)) c[x]+=v; 38 } 39 LL sum(int x){ 40 LL r=0; 41 for(;x;x-=x&(-x)) r+=c[x]; 42 return r; 43 } 44 void solve(int o,int L,int R){ 45 if (!V[o].size()) return; 46 int mid=(L+R)>>1; 47 F(i,L,mid){ 48 if (l[i]>r[i]) add(1,a[i]); 49 add(l[i],a[i]); add(r[i]+1,-a[i]); 50 } 51 rep(i,V[o].size()){ 52 int x=V[o][i]; LL y=0; 53 rep(j,G[x].size()){ 54 y+=sum(G[x][j]); 55 if (y>=p[x]) break; 56 } 57 if (y>=p[x]){ 58 if (L==R) ans[x]=L; 59 else V[o<<1].pb(x); 60 }else{ 61 if (L==R) ans[x]=-1; 62 else{ 63 p[x]-=y; 64 V[o<<1|1].pb(x); 65 } 66 } 67 } 68 F(i,L,mid){ 69 if (l[i]>r[i]) add(1,-a[i]); 70 add(l[i],-a[i]); add(r[i]+1,a[i]); 71 } 72 if (L==R) return; 73 solve(o<<1,L,mid); solve(o<<1|1,mid+1,R); 74 } 75 76 int main(){ 77 #ifndef ONLINE_JUDGE 78 freopen("2527.in","r",stdin); 79 freopen("2527.out","w",stdout); 80 #endif 81 n=getint(); m=getint(); 82 F(i,1,m){ 83 int x=getint(); 84 G[x].pb(i); 85 } 86 F(i,1,n) p[i]=getint(); 87 K=getint(); 88 F(i,1,K){ 89 l[i]=getint(); r[i]=getint(); a[i]=getint(); 90 } 91 F(i,1,n) V[1].pb(i); 92 solve(1,1,K); 93 F(i,1,n){ 94 if (ans[i]!=-1) printf("%d ",ans[i]); 95 else puts("NIE"); 96 } 97 return 0; 98 } 99
2527: [Poi2011]Meteors
Time Limit: 60 Sec Memory Limit: 128 MBSubmit: 415 Solved: 165
[Submit][Status][Discuss]
Description
Byteotian
Interstellar Union (BIU) has recently discovered a new planet in a
nearby galaxy. The planet is unsuitable for colonisation due to strange
meteor showers, which on the other hand make it an exceptionally
interesting object of study.
The
member states of BIU have already placed space stations close to the
planet's orbit. The stations' goal is to take samples of the rocks
flying by. The BIU Commission has partitioned the orbit into msectors,
numbered from 1to m, where the sectors 1and mare adjacent. In each
sector there is a single space station, belonging to one of the nmember
states.
Each
state has declared a number of meteor samples it intends to gather
before the mission ends. Your task is to determine, for each state, when
it can stop taking samples, based on the meter shower predictions for
the years to come.
Byteotian Interstellar Union有N个成员国。现在它发现了一颗新的星球,这颗星球的轨道被分为M份(第M份和第1份相邻),第i份上有第Ai个国家的太空站。
这个星球经常会下陨石雨。BIU已经预测了接下来K场陨石雨的情况。
BIU的第i个成员国希望能够收集Pi单位的陨石样本。你的任务是判断对于每个国家,它需要在第几次陨石雨之后,才能收集足够的陨石。
输入:
第一行是两个数N,M。
第二行有M个数,第i个数Oi表示第i段轨道上有第Oi个国家的太空站。
第三行有N个数,第i个数Pi表示第i个国家希望收集的陨石数量。
第四行有一个数K,表示BIU预测了接下来的K场陨石雨。
接下来K行,每行有三个数Li,Ri,Ai,表示第K场陨石雨的发生地点在从Li顺时针到Ri的区间中(如果Li<=Ri,就是Li,Li+1,...,Ri,否则就是Ri,Ri+1,...,m-1,m,1,...,Li),向区间中的每个太空站提供Ai单位的陨石样本。
输出:
N行。第i行的数Wi表示第i个国家在第Wi波陨石雨之后能够收集到足够的陨石样本。如果到第K波结束后仍然收集不到,输出NIE。
数据范围:
数据范围: 1<=n,m,k<=3*10^5 1<=Pi<=10^9 1<=Ai<10^9
Input
The first line of the standard input gives two integers, n and m(1<=n,m<=3*10^5) separated by a single space, that denote, respectively, the number of BIU member states and the number of sectors the orbit has been partitioned into.
In the second line there are mintegers Oi(1<=Oi<=n) separated by single spaces, that denote the states owning stations in successive sectors.
In the third line there are nintegers Pi(1<=Pi<=10^9) separated by single spaces, that denote the numbers of meteor samples that the successive states intend to gather.
In the fourth line there is a single integer k(1<=k<=3*10^5) that denotes the number of meteor showers predictions. The following klines specify the (predicted) meteor showers chronologically. The i-th of these lines holds three integers Li, Ri, Ai(separated by single spaces), which denote that a meteor shower is expected in sectors Li,Li+1,…Ri (if Li<=Ri) or sectors Li,Li+1,…,m,1,…Ri (if Li>Ri), which should provide each station in those sectors with Aimeteor samples (1<=Ai<10^9).
In tests worth at least 20% of the points it additionally holds that .
Output
Your program should print nlines on the standard output. The i-th of them should contain a single integer Wi, denoting the number of shower after which the stations belonging to the i-th state are expected to gather at least Pi samples, or the word NIE (Polish for no) if that state is not expected to gather enough samples in the foreseeable future.
Sample Input
3 5
1 3 2 1 3
10 5 7
3
4 2 4
1 3 1
3 5 2
1 3 2 1 3
10 5 7
3
4 2 4
1 3 1
3 5 2
Sample Output
3
NIE
1
NIE
1