To avoid unsightly burns while tanning, each of the C (1 ≤ C ≤ 2500) cows must cover her hide with sunscreen when they're at the beach. Cow i has a minimum and maximum SPF rating (1 ≤ minSPF_i ≤ 1,000; minSPF_i ≤ maxSPF_i ≤ 1,000) that will work. If the SPF rating is too low, the cow suffers sunburn; if the SPF rating is too high, the cow doesn't tan at all........

The cows have a picnic basket with L (1 ≤ L ≤ 2500) bottles of sunscreen lotion, each bottle i with an SPF rating SPF_i (1 ≤ SPF_i ≤ 1,000). Lotion bottle i can cover cover_i cows with lotion. A cow may lotion from only one bottle.

What is the maximum number of cows that can protect themselves while tanning given the available lotions?

* Line 1: Two space-separated integers: C and L
* Lines 2..C+1: Line i describes cow i's lotion requires with two integers: minSPF_i and maxSPF_i 
* Lines C+2..C+L+1: Line i+C+1 describes a sunscreen lotion bottle i with space-separated integers: SPF_i and cover_i

A single line with an integer that is the maximum number of cows that can be protected while tanning

#include <iostream>

#include <algorithm>

#include <cstring>

#include <cstdio>

#include <queue>

#include <functional>

#include <utility>

using namespace std;

/*

3 2       // C只牛  L个防晒霜

C 行

3 10      minSPF, maxSPF

2 5

1 5

L行

6 2      每种数量, 固定的阳光强度

4 1

*/

const int maxn = ;

int C, L;                 // C只奶牛 , L

typedef pair<int, int> P; // minSPF, maxSPF

//小值先出

priority_queue<int, vector<int>, greater<int> > q;

P cow[maxn], bot[maxn];  //牛(min,max) 和 防晒霜(固定的阳光数, 数量) 

void solve();

void input();

void input()

{

    scanf("%d%d", &C, &L);

    for (int i = ; i < C; i++) {

        scanf("%d%d", &cow[i].first, &cow[i].second);

    }

    for (int i = ; i < L; i++) {

        scanf("%d%d", &bot[i].first, &bot[i].second);

    }

}

void solve()

{

    input();

    sort(cow, cow + C);    //按照最小值阳光强度升序

    sort(bot, bot + L);    //(first)按照能固定的阳光强度升序

    int j = , ans = ;

    //当  L 个 防晒霜

    for (int i = ; i < L; i++)

    {

        //将最小值阳光 和 固定的阳光强度 比较

        while (j < C && cow[j].first <= bot[i].first) {

            q.push(cow[j].second);    //添加到优先队列  (最小值阳光)

            j++;

        }        

        //如果 最小值阳光 序列不空，当前 防晒霜未用完

        while (!q.empty() && bot[i].second) {

            int x = q.top(); q.pop();

            // 最小值 小于  能固定的阳光, 方案不存在

            if (x < bot[i].first) continue;

            //否则,

            ans++;

            //当前防晒霜--

            bot[i].second--;

        }

    }

    printf("%d\n", ans);

}

int main()

{

    solve();

    return ;

}