D. Statistics of Recompressing Videos

D. Statistics of Recompressing Videos
time limit per test 3 seconds
memory limit per test 256 megabytes
input standard input
output standard output

A social network for dogs called DH (DogHouse) has k special servers to recompress uploaded videos of cute cats. After each video is uploaded, it should be recompressed on one (any) of the servers, and only after that it can be saved in the social network.

We know that each server takes one second to recompress a one minute fragment. Thus, any server takes m seconds to recompress am minute video.

We know the time when each of the n videos were uploaded to the network (in seconds starting from the moment all servers started working). All videos appear at different moments of time and they are recompressed in the order they appear. If some video appeared at time s, then its recompressing can start at that very moment, immediately. Some videos can await recompressing when all the servers are busy. In this case, as soon as a server is available, it immediately starts recompressing another video. The videos that await recompressing go in a queue. If by the moment the videos started being recompressed some servers are available, then any of them starts recompressing the video.

For each video find the moment it stops being recompressed.

Input

The first line of the input contains integers n and k (1 ≤ n, k ≤ 5·105) — the number of videos and servers, respectively.

Next n lines contain the descriptions of the videos as pairs of integers si, mi (1 ≤ si, mi ≤ 109), where si is the time in seconds when the i-th video appeared and mi is its duration in minutes. It is guaranteed that all the si's are distinct and the videos are given in the chronological order of upload, that is in the order of increasing si.

Output

Print n numbers e1, e2, ..., en, where ei is the time in seconds after the servers start working, when the i-th video will be recompressed.

Examples
input
3 2
1 5
2 5
3 5
output
6
7
11
input
6 1
1 1000000000
2 1000000000
3 1000000000
4 1000000000
5 1000000000
6 3
output
1000000001
2000000001
3000000001
4000000001
5000000001
5000000004

 

#include<stdio.h>
#include<string.h>
#include<queue>
using namespace std;
#define lol  long long
struct node
{
    lol pos;lol end;
    friend bool operator < (node a,node b)
    {
        return a.end>b.end;
    }
}now,nex;
lol ans[3000000];
int main()
{
    freopen("water.in","r",stdin);
    freopen("water.out","w",stdout);
    lol n,m;
    while(~scanf("%lld%lld",&n,&m))
    {
        priority_queue<node>s;
        for(lol i=0;i<n;i++)
        {
            lol a,b;
            scanf("%lld%lld",&a,&b);
            while(s.size()>0&&s.top().end<a)ans[s.top().pos]=s.top().end,s.pop();
            if(s.size()<m)
            {
                now.end=a+b;
                now.pos=i;
                s.push(now);
            }
            else
            {
                now.end=s.top().end+b;
                ans[s.top().pos]=s.top().end;
                s.pop();
                now.pos=i;
                s.push(now);
            }
        }
        while(!s.empty())
        {
            ans[s.top().pos]=s.top().end;
            s.pop();
        }
        for(lol i=0;i<n;i++)
        {
            printf("%lld\n",ans[i]);
        }
    }
}

 

posted @ 2017-08-18 16:36  kakakakakaka  阅读(564)  评论(0编辑  收藏  举报

Never forget why you start

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