洛谷P3004 [USACO10DEC]宝箱Treasure Chest
题目描述
Bessie and Bonnie have found a treasure chest full of marvelous gold coins! Being cows, though, they can't just walk into a store and buy stuff, so instead they decide to have some fun with the coins.
The N (1 <= N <= 5,000) coins, each with some value C_i (1 <= C_i <= 5,000) are placed in a straight line. Bessie and Bonnie take turns, and for each cow's turn, she takes exactly one coin off of either the left end or the right end of the line. The game ends when there are no coins left.
Bessie and Bonnie are each trying to get as much wealth as possible for themselves. Bessie goes first. Help her figure out the maximum value she can win, assuming that both cows play optimally.
Consider a game in which four coins are lined up with these values:
30 25 10 35
Consider this game sequence:
Bessie Bonnie New Coin
Player Side CoinValue Total Total Line
Bessie Right 35 35 0 30 25 10
Bonnie Left 30 35 30 25 10
Bessie Left 25 60 30 10
Bonnie Right 10 60 40 --
This is the best game Bessie can play.
贝西和伯尼找到了一个装满了金币的宝箱!但是,作为奶牛,他们不能随便进入一家商店去买东西。所以他们决定去用这些金币玩一个游戏。
这里有N(1<=N<=5000)个硬币,每个都有一个价值C_i(1<=C_i<=5000)。这些硬币被摆成了一行。贝西和伯尼每人一回合。到了一只奶牛的回合时,他就要拿走最左边或者最右边的硬币。当没有硬币时,游戏结束。
贝西和伯尼都想要使自己拿到的金币价值尽量高,贝西先拿。现在贝西想要你帮帮她,算出她最多可以拿多少钱(伯尼也会尽量取到最优)。
输入输出格式
输入格式:
-
Line 1: A single integer: N
- Lines 2..N+1: Line i+1 contains a single integer: C_i
输出格式:
- Line 1: A single integer, which is the greatest total value Bessie can win if both cows play optimally.
输入输出样例
4 30 25 10 35
60
/* 区间dp f[i][j]表示在i,j这段区间内先手能获得的最大分数; 那么后手在先手最优方案走法下,按最优方案走的最大分数就是 i,j这个区间总分数减去f[i][j]. */ #include<iostream> #include<cstdio> using namespace std; #define maxn 5010 int w[maxn],sum[maxn],f[maxn][maxn],n; int main(){ scanf("%d",&n); for(int i=1;i<=n;i++){ scanf("%d",&w[i]); sum[i]=sum[i-1]+w[i]; f[i][i]=w[i]; } for(int len=2;len<=n;len++){ for(int l=1;l+len-1<=n;l++){ int r=l+len-1; f[l][r]=sum[r]-sum[l-1]-min(f[l][r-1],f[l+1][r]); } } printf("%d",f[1][n]); }
#include<iostream> #include<cstdio> #define maxn 5010 using namespace std; int n,sum[maxn],f[maxn]; int main(){ scanf("%d",&n); int x; for(int i=1;i<=n;i++){ scanf("%d",&x); sum[i]=sum[i-1]+x; f[i]=x; } for(int len=2;len<=n;len++) for(int l=1;l+len-1<=n;l++){ int r=l+len-1; f[l]=sum[r]-sum[l-1]-min(f[l+1],f[l]); } printf("%d",f[1]); }