hihocoder1636-Pangu and Stones
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#1636 : Pangu and Stones
- 样例输入
3 2 21 2 33 2 31 2 34 3 31 2 3 4
- 样例输出
960
描述
In Chinese mythology, Pangu is the first living being and the creator of the sky and the earth. He woke up from an egg and split the egg into two parts: the sky and the earth.
At the beginning, there was no mountain on the earth, only stones all over the land.
There were N piles of stones, numbered from 1 to N. Pangu wanted to merge all of them into one pile to build a great mountain. If the sum of stones of some piles was S, Pangu would need S seconds to pile them into one pile, and there would be S stones in the new pile.
Unfortunately, every time Pangu could only merge successive piles into one pile. And the number of piles he merged shouldn't be less than L or greater than R.
Pangu wanted to finish this as soon as possible.
Can you help him? If there was no solution, you should answer '0'.
输入
There are multiple test cases.
The first line of each case contains three integers N,L,R as above mentioned (2<=N<=100,2<=L<=R<=N).
The second line of each case contains N integers a1,a2 …aN (1<= ai <=1000,i= 1…N ), indicating the number of stones of pile 1, pile 2 …pile N.
The number of test cases is less than 110 and there are at most 5 test cases in which N >= 50.
输出
For each test case, you should output the minimum time(in seconds) Pangu had to take . If it was impossible for Pangu to do his job, you should output 0.
题意:给你n个数字,每次只能将连续的l到r个数字合并,花费为合并数字的和,问最后将所有数字合为一个数字的最小花费
解题思路:区间dp,dp[i][j][k]表示以i为开头j为结尾的区间分为k份需要的最少花费,dp[i][j][k]=min(dp[i][j][k],dp[i][p][k-1]+dp[p+1][j][1]),dp[i][j][1]=dp[i][j][k]+sum[j]-sum[i-1](k>=l&&k<=r)
#include <iostream>#include <cstdio>#include <cstring>#include <string>#include <algorithm>#include <cmath>#include <map>#include <set>#include <stack>#include <queue>#include <vector>#include <bitset>#include <functional>using namespace std;#define LL long longconst int INF = 0x3f3f3f3f;int n, l, r;int a[109], dp[109][109][109], sum[109];int main(){while (~scanf("%d%d%d", &n, &l, &r)){memset(dp, INF, sizeof dp);sum[0] = 0;for (int i = 1; i <= n; i++)scanf("%d", &a[i]), dp[i][i][1] = 0, sum[i] = sum[i-1] + a[i];for (int i = 2; i <= n; i++){for (int j = 1; j + i - 1 <= n; j++){for (int k = 2; k <= i; k++){for (int p = j; p <= j + i - 2; p++)dp[j][i + j - 1][k] = min(dp[j][j + i - 1][k], dp[j][p][k - 1] + dp[p + 1][j + i - 1][1]);if (k >= l&&k <= r) dp[j][j + i - 1][1] = min(dp[j][j + i - 1][1], dp[j][j + i - 1][k] + sum[j + i - 1] - sum[j - 1]);}}}if (dp[1][n][1] >= INF) dp[1][n][1] = 0;printf("%d\n", dp[1][n][1]);}return 0;}
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