Codeforces Round #317 (Div. 2) D Minimization (贪心+dp)
You've got array A, consisting of n integers and a positive integer k. Array A is indexed by integers from 1 to n.
You need to permute the array elements so that value
The first line contains two integers n, k (2 ≤ n ≤ 3·105, 1 ≤ k ≤ min(5000, n - 1)).
The second line contains n integers A[1], A[2], ..., A[n] ( - 109 ≤ A[i] ≤ 109), separate by spaces — elements of the array A.
Print the minimum possible value of the sum described in the statement.
You've got array A, consisting of n integers and a positive integer k. Array A is indexed by integers from 1 to n.
You need to permute the array elements so that value
The first line contains two integers n, k (2 ≤ n ≤ 3·105, 1 ≤ k ≤ min(5000, n - 1)).
The second line contains n integers A[1], A[2], ..., A[n] ( - 109 ≤ A[i] ≤ 109), separate by spaces — elements of the array A.
Print the minimum possible value of the sum described in the statement.
按照下标取模后的值可以分成k组,对于一组来说,按照升序排相邻的差之和是最小的,可用交换法证明,不难看出,总和等于a[end]-a[start]。对于不同的两组,
公共元素一定在端点,同样交换法可证,因此将整个数组排序以后相同一组一定连续。有n%k个长度为n/k+1的,其他的长度为n/k。
因此需要决策长度的选法,定义dp[i][j]表示选了i个长度为n/k+1,j个长度为n/k的组的最小花费。那么决策是下一个区间是长或者是短,边界条件dp[0][0] = 0表示什么也不选的时候花费为0。dp[i][j] = min(dp[i-1][j]+cost(i-1,j,L),dp[i][j-1]+cost(i,j-1,S))。
#include<bits/stdc++.h> using namespace std; const int maxn = 3e5+5, maxk = 5001; int a[maxn]; int dp[2][maxk]; int n,k,len; int cost(int i,int j,int L) { int s = (i+j)*len+i, e = s+len+L-1; return a[e]-a[s]; } int main() { //freopen("in.txt","r",stdin); scanf("%d%d",&n,&k); for(int i = 0; i < n; i++) scanf("%d",a+i); sort(a,a+n); int tot = k, r = n%k; int L = r, S = tot-r; len = n/k; for(int i = 0; i <= L; i++){ int cur = i&1, pre = cur^1; for(int j = 0; j <= S; j++){ if(i && j) dp[cur][j] = min(dp[pre][j]+cost(i-1,j,1),dp[cur][j-1]+cost(i,j-1,0)); else if(i) dp[cur][j] = dp[pre][j]+cost(i-1,j,1); else if(j) dp[cur][j] = dp[cur][j-1]+cost(i,j-1,0); else dp[cur][j] = 0; } } printf("%d",dp[L&1][S]); return 0; }
