codeforces 577E E. Points on Plane(构造+分块)

时间:2023-03-09 20:14:58
codeforces 577E E. Points on Plane(构造+分块)

题目链接:

E. Points on Plane

time limit per test

2 seconds

memory limit per test

256 megabytes

input

standard input

output

standard output

On a plane are n points (xiyi) with integer coordinates between 0 and 106. The distance between the two points with numbers a and bis said to be the following value: codeforces 577E E. Points on Plane(构造+分块) (the distance calculated by such formula is called Manhattan distance).

We call a hamiltonian path to be some permutation pi of numbers from 1 to n. We say that the length of this path is value codeforces 577E E. Points on Plane(构造+分块).

Find some hamiltonian path with a length of no more than 25 × 108. Note that you do not have to minimize the path length.

Input

The first line contains integer n (1 ≤ n ≤ 106).

The i + 1-th line contains the coordinates of the i-th point: xi and yi (0 ≤ xi, yi ≤ 106).

It is guaranteed that no two points coincide.

Output

Print the permutation of numbers pi from 1 to n — the sought Hamiltonian path. The permutation must meet the inequality codeforces 577E E. Points on Plane(构造+分块).

If there are multiple possible answers, print any of them.

It is guaranteed that the answer exists.

Examples
input
5
0 7
8 10
3 4
5 0
9 12
output
4 3 1 2 5 

题意:

现在给n个点,要求你找到一个顺序,这个顺序中的曼哈顿距离不能超过25*1e8;

思路:

构造的题,想到原来莫队算法中给数分块,然后降低复杂度的思想,然后我就想分块,然后看一下在最坏的情况下是否会超过上限;
按1e3的长度分块,然后这个块内要么按y的升序要么按Y的降序排列,这样每个块内平均下来最大的距离是1e3*1e3+1e6=2e6,一共1e3个块,所以一共2e9的距离符合要求;
还有就是要按块的位置升降序交替,使点呈现v和倒v的状态,不然每两个块相靠的地方会多出一个1e6,最后多了1e9就过不了了;

AC代码:
#include <iostream>

#include <cstdio>

#include <cstring>

#include <algorithm>

#include <cmath>

#include <bits/stdc++.h>

#include <stack>

#include <map>

using namespace std;

#define For(i,j,n) for(int i=j;i<=n;i++)

#define mst(ss,b) memset(ss,b,sizeof(ss));

typedef  long long LL;

template<class T> void read(T&num) {

    char CH; bool F=false;

    for(CH=getchar();CH<'0'||CH>'9';F= CH=='-',CH=getchar());

    for(num=0;CH>='0'&&CH<='9';num=num*10+CH-'0',CH=getchar());

    F && (num=-num);

}

int stk[70], tp;

template<class T> inline void print(T p) {

    if(!p) { puts("0"); return; }

    while(p) stk[++ tp] = p%10, p/=10;

    while(tp) putchar(stk[tp--] + '0');

    putchar('\n');

}

const int mod=1e9+7;

const double PI=acos(-1.0);

const int inf=1e9;

const int N=1e6+20;

const int maxn=1e3;

const double eps=1e-12;

struct node

{

    int x,y,id,pos;

}po[N];

int n;

int cmp(node a,node b)

{

    if(a.pos==b.pos)

    {

        if(a.pos%2==1)return a.y<b.y;

        return a.y>b.y;

    }

    return a.pos<b.pos;

}

int main()

{

    read(n);

    For(i,1,n)

    {

        read(po[i].x);

        read(po[i].y);

        po[i].pos=po[i].x/maxn;

        po[i].id=i;

    }

    sort(po+1,po+n+1,cmp);

    For(i,1,n)printf("%d ",po[i].id);

    return 0;

}