Problem Description
Now I think you have got an AC in Ignatius.L's "Max Sum" problem. To be a brave ACMer, we always challenge ourselves to more difficult problems. Now you are faced with a more difficult problem.
Given a consecutive number sequence S 1, S 2, S 3, S 4 ... S x, ... S n (1 ≤ x ≤ n ≤ 1,000,000, -32768 ≤ S x ≤ 32767). We define a function sum(i, j) = S i + ... + S j (1 ≤ i ≤ j ≤ n).
Now given an integer m (m > 0), your task is to find m pairs of i and j which make sum(i 1, j 1) + sum(i 2, j 2) + sum(i 3, j 3) + ... + sum(i m, j m) maximal (i x ≤ i y ≤ j x or i x ≤ j y ≤ j x is not allowed).
But I`m lazy, I don't want to write a special-judge module, so you don't have to output m pairs of i and j, just output the maximal summation of sum(i x, j x)(1 ≤ x ≤ m) instead. ^_^
Given a consecutive number sequence S 1, S 2, S 3, S 4 ... S x, ... S n (1 ≤ x ≤ n ≤ 1,000,000, -32768 ≤ S x ≤ 32767). We define a function sum(i, j) = S i + ... + S j (1 ≤ i ≤ j ≤ n).
Now given an integer m (m > 0), your task is to find m pairs of i and j which make sum(i 1, j 1) + sum(i 2, j 2) + sum(i 3, j 3) + ... + sum(i m, j m) maximal (i x ≤ i y ≤ j x or i x ≤ j y ≤ j x is not allowed).
But I`m lazy, I don't want to write a special-judge module, so you don't have to output m pairs of i and j, just output the maximal summation of sum(i x, j x)(1 ≤ x ≤ m) instead. ^_^
Input
Each test case will begin with two integers m and n, followed by n integers S
1, S
2, S
3 ... S
n.
Process to the end of file.
Process to the end of file.
Output
Output the maximal summation described above in one line.
Sample Input
1 3 1 2 3
2 6 -1 4 -2 3 -2 3
Sample Output
6
8
题意:给你一个序列n个数组成,然后让你在里面找到m个字子串(不能有交叉,也不能有连接 的情况),让这m个子串的和最大。
题解:一眼扫过去就是DP,划分问题,第j个选择或者不选, 选(是继续上一个子串还是重新开一个子串),不选(不考虑,所以需要维护一个当前的最大值(ans/tmax))
最初的状态转移方程:d[i][j]=max(d[i][j-1],d[i-1][k])+num[j],其中k=i-1,i,...,j-1;(没有优化的话大概三重循环)
数据给的很大,有两个方面的优化:时间和空间,
优化:时间(选择k的那一重循环可以用空间换,用pre[i]来表示到i的时候(不包括num[i])的最大值),循环的时候更新一下,就可以不用循环k那一层了;
空间:二维数组优化为一维数组,d[i][j]=max(d[i][j-1], pre[j-1])+num[j], 写出pre后明显可以直接去掉一个维度;
优化后的状态转移方程式:d[j]=max(d[j-1],pre[j-1])+num[j]
反思:这题写的时候,初始方程可以正常的写出来的, 但是用个pre数组来直接去掉k的那一层循环是不会的,思维有点狭隘,一直就想着通过类似01背包的方法来优化, 而没有想到再开一个数组就解决了。
#include <cstdio> #include <iostream> #include <cstring> using namespace std; const int INF=0x3f3f3f3f; const int maxn=1e6+5; int f[maxn], pre[maxn], a[maxn]; int main() { //freopen("in.txt", "r", stdin); int m,n; while(cin>>m>>n) { for(int i=1; i<=n; i++) cin>>a[i]; memset(f, 0, sizeof(f)); memset(pre, 0, sizeof(pre)); int tmax; for(int i=1; i<=m; i++) { tmax=-INF; for(int j=i; j<=n; j++) { f[j]=max(f[j-1], pre[j-1])+a[j]; pre[j-1]=tmax; //注意pre的更新的顺序,pre[j-1]被使用后再更新pre[j-1] tmax=max(tmax, f[j]); } } cout<<tmax<<endl; } return 0; }