CF847E Packmen 题解
作者:互联网
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奇怪的东西
- WA了两小时
- 比rk2快一倍,但代码长4倍
请思考本题用dp怎么做
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题意
今有一区间,人,物具陈其上,间或亦有空.其人可左右徙于上.求让人的移动轨迹覆盖所有物品的情况下,人移动的路程的最大值的最小值. -
题解
根据题意,显然看出是二分.再考虑一个人的走法:
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向左走,不回头
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向右走,不回头
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向左再向右,左边重复走
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向右再向左,右边重复走
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若我们从左到右把人扫一遍,必然要保证先把左边的没走到的物品走到,同时在还有步数的情况下向右走.
这样会WA on #7 ,原因在于先向右走再向左走到第一个没走到的物品可能更优,因为重复的部分可能更少.
考虑分类讨论:用一个物品指针指向还没走到的最靠左的物品
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步数不够到达最左边的没走到的物品\(\to\)直接
return false -
步数只能到最左边的物品,无法向右走\(\to\)把物品指针向右更新到人右边
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步数很充足\(\to\)在3,4两种走法中取最优解
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指针在人右边\(\to\)把物品指针尽可能向右更新
结束后判断指针是否大于\(Cnt_{package}\)即可
这样就又WA了,原因在于二分的右边界应当是\(\frac{3n}{2}\),即只有一个人在正中间,先向某方向然后再折返的答案,程序里为了简单写成了\(2n\).
最终复杂度:\(O(Cnt_{people}\log2n)\),明显快于\(O(n\log2n)\).
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代码
#include <iostream>
#include <cstdio>
using namespace std;
const int N = 100005;
int n, L, R, cnt1, cnt2;
int peo[N], pack[N];
string s;
bool check(int k)
{
int await_pick = 1;
for (int i = 1; i <= cnt1; i++)
{
int start_pos = await_pick;
if (await_pick > cnt2)
return true;
if (pack[start_pos] < peo[i])
{
if (pack[start_pos] < peo[i] - k)//第一种情况
return false;
if (k <= peo[i] - pack[start_pos] + 1)//第二种情况
{
while (pack[await_pick + 1] <= peo[i] && await_pick <= cnt2 && pack[await_pick + 1] <= peo[i + 1])
await_pick++;
if (pack[await_pick] <= peo[i] && pack[await_pick] <= peo[i + 1])
await_pick++;
}
else
{
if (k > (2 * (peo[i] - pack[start_pos])))
{//第三种情况,先向左走
int temp = k - (2 * (peo[i] - pack[start_pos]));
while (pack[await_pick + 1] <= peo[i] + temp && await_pick <= cnt2 && pack[await_pick + 1] <= peo[i + 1])
await_pick++;
if (pack[await_pick] <= peo[i] + temp && pack[await_pick] <= peo[i + 1])
await_pick++;
}
if (peo[i] + (k + pack[start_pos] - peo[i]) / 2 >= pack[await_pick])
{//第三种情况,先向右走
int temp = (k + pack[start_pos] - peo[i]) / 2;
while (pack[await_pick + 1] <= peo[i] + temp && await_pick <= cnt2 && pack[await_pick + 1] <= peo[i + 1])
await_pick++;
if (pack[await_pick] <= peo[i] + temp && pack[await_pick] <= peo[i + 1])
await_pick++;
}
}
}
else
{//第四种情况
while (pack[await_pick + 1] <= peo[i] + k && await_pick <= cnt2 && pack[await_pick + 1] <= peo[i + 1])
await_pick++;
if (pack[await_pick] <= peo[i] + k && await_pick <= cnt2 && pack[await_pick] <= peo[i + 1])
await_pick++;
}
}
if (await_pick > cnt2)
return true;
else
return false;
}
int main()
{
ios::sync_with_stdio(false);
cin >> n >> s;
for (int i = 0; i < s.length(); i++)
{
if (s[i] == 'P')
peo[++cnt1] = i + 1;
if (s[i] == '*')
pack[++cnt2] = i + 1;
}
peo[cnt1 + 1] = 0x7fffffff;
pack[cnt2 + 1] = 0x7fffffff;
L = 1, R = 2 * n;//注意二分边界
while (L <= R)
{
int mid = (L + R) / 2;
if (check(mid))
R = mid - 1;
else
L = mid + 1;
}
cout << L;
}
标签:CF847E,int,题解,peo,cnt2,向右走,物品,Packmen,pack 来源: https://www.cnblogs.com/KinuhataSaiai/p/15512161.html