在xoy直角坐标平面上有n条直线L1,L2,...Ln,若在y值为正无穷大处往下看,能见到Li的某个子线段,则称Li为
可见的,否则Li为被覆盖的.
例如,对于直线:
L1:y=x; L2:y=-x; L3:y=0
则L1和L2是可见的,L3是被覆盖的.
给出n条直线,表示成y=Ax+B的形式(|A|,|B|<=500000),且n条直线两两不重合.求出所有可见的直线.

　　第一行为N(0 < N < 50000),接下来的N行输入Ai,Bi

　　从小到大输出可见直线的编号，两两中间用空格隔开,最后一个数字后面也必须有个空格

#include <cmath>

#include <cstdio>

#include <cstdlib>

#include <cstring>

#include <iostream>

#include <algorithm>

#define MAXN 50010

#define Eps 1e-18

using namespace std;

struct Liyn{

  int k, b, pos;

  void Push(int i) {scanf("%d%d", &k, &b); pos = i;}

  bool operator == (const Liyn &a)const {return k == a.k;}

  bool operator < (const Liyn &a)const {return k < a.k || (k == a.k && b > a.b);}

  double Cmp(const Liyn &a) {return double(a.b - b) / double(k - a.k);}

}L[MAXN], _pb[MAXN];

int n, top, ans[MAXN];

int main(){

  scanf("%d", &n);

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

    L[i].Push(i);

  sort(L, L + n);

  n = unique(L, L + n) - L;

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

    while(top >  && _pb[top - ].Cmp(_pb[top - ]) > L[i].Cmp(_pb[top - ]) - Eps)top--;

    _pb[top++] = L[i];

  }

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

    ans[i] = _pb[i].pos;

  sort(ans, ans + top);

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

    printf("%d ", ans[i] + );

  return ;

}