Time Limit: 15000MS | Memory Limit: 228000K | |
Total Submissions: 28911 | Accepted: 8744 | |
Case Time Limit: 5000MS |
Description
The SUM problem can be formulated as follows: given four lists A, B, C, D of integer values, compute how many quadruplet (a, b, c, d ) ∈ A x B x C x D are such that a + b + c + d = 0 . In the following, we assume that all lists have the same size n .
Input
The first line of the input file contains the size of the lists n (this value can be as large as 4000). We then have n lines containing four integer values (with absolute value as large as 228 ) that belong respectively to A, B, C and D .
Output
For each input file, your program has to write the number quadruplets whose sum is zero.
Sample Input
6
-45 22 42 -16
-41 -27 56 30
-36 53 -37 77
-36 30 -75 -46
26 -38 -10 62
-32 -54 -6 45
Sample Output
5
Hint
Sample Explanation: Indeed, the sum of the five following quadruplets is zero: (-45, -27, 42, 30), (26, 30, -10, -46), (-32, 22, 56, -46),(-32, 30, -75, 77), (-32, -54, 56, 30).
Source
题解:
二分。先枚举 num=a+b的所有情况, 在考虑temp=c+d,二分查找第一个中是否有num=-temp的情况。
利用了 STL 中的 upper_bound lower_bound来找到a+d= -temp(c+d)的区间元素个数
STL中的函数:(使用前要先排序。)
1.lower_bound算法返回一个非递减序列[first, last)中的第一个大于等于val的位置,
2.upper_bound算法返回一个非递减序列[first, last)中的第一个大于val的位置。
如果所有元素都小于val, 则返回last的位置;
#include<iostream>
#include<cstdio>
#include<string>
#include<algorithm>
using namespace std;
int a[4500],b[4500],c[4500],d[4500];
int num[4500*4500];
int main(){
int n;
cin>>n;
for(int i=0;i<n;i++){
cin>>a[i]>>b[i]>>c[i]>>d[i];
}
int ans=0,cnt=0;
for(int i=0;i<n;i++){
for(int j=0;j<n;j++){
num[cnt++]=a[i]+b[j];
}
}
sort(num,num+cnt);
for(int i=0;i<n;i++){
for(int j=0;j<n;j++){
int temp=c[i]+d[j];
ans+=(upper_bound(num,num+cnt,-temp)-lower_bound(num,num+cnt,-temp));
}
}
cout<<ans<<endl;
return 0;
}