Farmer John's N (1 <= N <= 50,000) cows (numbered 1..N) are planning to run away and join the circus. Their hoofed feet prevent them from tightrope walking and swinging from the trapeze (and their last attempt at firing a cow out of a cannon met with a dismal failure). Thus, they have decided to practice performing acrobatic stunts.
The cows aren't terribly creative and have only come up with one acrobatic stunt: standing on top of each other to form a vertical stack of some height. The cows are trying to figure out the order in which they should arrange themselves ithin this stack.
Each of the N cows has an associated weight (1 <= W_i <= 10,000) and strength (1 <= S_i <= 1,000,000,000). The risk of a cow collapsing is equal to the combined weight of all cows on top of her (not including her own weight, of course) minus her strength (so that a stronger cow has a lower risk). Your task is to determine an ordering of the cows that minimizes the greatest risk of collapse for any of the cows.
The cows aren't terribly creative and have only come up with one acrobatic stunt: standing on top of each other to form a vertical stack of some height. The cows are trying to figure out the order in which they should arrange themselves ithin this stack.
Each of the N cows has an associated weight (1 <= W_i <= 10,000) and strength (1 <= S_i <= 1,000,000,000). The risk of a cow collapsing is equal to the combined weight of all cows on top of her (not including her own weight, of course) minus her strength (so that a stronger cow has a lower risk). Your task is to determine an ordering of the cows that minimizes the greatest risk of collapse for any of the cows.
Input
* Line 1: A single line with the integer N.
* Lines 2..N+1: Line i+1 describes cow i with two space-separated integers, W_i and S_i.
* Lines 2..N+1: Line i+1 describes cow i with two space-separated integers, W_i and S_i.
Output
* Line 1: A single integer, giving the largest risk of all the cows in any optimal ordering that minimizes the risk.
Sample Input
3 10 3 2 5 3 3
Sample Output
2
Hint
OUTPUT DETAILS:
Put the cow with weight 10 on the bottom. She will carry the other two cows, so the risk of her collapsing is 2+3-3=2. The other cows have lower risk of collapsing.
Put the cow with weight 10 on the bottom. She will carry the other two cows, so the risk of her collapsing is 2+3-3=2. The other cows have lower risk of collapsing.
题解:
和国王游戏很像对不对,有是一道贪心题,顺序是按照si+wi从小到大排序!为什么呢?我们来证明一下。
首先两个相邻的牛i,i+1,根据排序有wi+si<w(i+1)+s(i+1).我们考虑每个牛的危险度,对于不是i和i+1的其他牛,因为他们的si不会变,所需要承受的重量不会变,所以危险度就不变,i这头牛的危险度是si-sum(Wi-1),i+1的危险度为s(i+1)-wi-sum(wi-1)。换位置,i+1这牛就是s(i+1)-sum(wi-1),i为si-(wi+1)-sum(wi-1).将做差就可以发现恒大于了。
代码:
#include <cstdio> #include <iostream> #include <algorithm> #include <cstring> #include <cmath> #include <iostream> #define MAXN 50100 #define ll long long using namespace std; struct node{ int w,s; }a[MAXN*2]; int n; bool cmp(node x,node y){ return x.w+x.s<y.w+y.s; } int main() { scanf("%d",&n); for(int i=1;i<=n;i++) scanf("%d%d",&a[i].w,&a[i].s); sort(a+1,a+n+1,cmp); int ans=-(1<<30),sum=0; for(int i=1;i<=n;i++){ ans=max(ans,sum-a[i].s); sum+=a[i].w; } printf("%d ",ans); return 0; }