POJ 2955 Brackets 【区间dp】【水题】
Time Limit: 1000MS | Memory Limit: 65536K | |
Total Submissions: 8027 | Accepted: 4264 |
Description
We give the following inductive definition of a “regular brackets” sequence:
- the empty sequence is a regular brackets sequence,
- if s is a regular brackets sequence, then (s) and [s] are regular brackets sequences, and
- if a and b are regular brackets sequences, then ab is a regular brackets sequence.
- no other sequence is a regular brackets sequence
For instance, all of the following character sequences are regular brackets sequences:
(), [], (()), ()[], ()[()]
while the following character sequences are not:
(, ], )(, ([)], ([(]
Given a brackets sequence of characters a1a2 … an, your goal is to find the length of the longest regular brackets sequence that is a subsequence of s. That is, you wish to find the largest m such that for indices i1, i2, …, im where 1 ≤ i1 < i2 < … < im ≤ n, ai1ai2 … aim is a regular brackets sequence.
Given the initial sequence ([([]])]
, the longest regular brackets subsequence is [([])]
.
Input
The input test file will contain multiple test cases. Each input test case consists of a single line containing only the characters (
, )
, [
, and ]
; each input test will have length between 1 and 100, inclusive.
The end-of-file is marked by a line containing the word “end” and should not be processed.
Output
For each input case, the program should print the length of the longest possible regular brackets subsequence on a single line.
Sample Input
((())) ()()() ([]]) )[)( ([][][) end
Sample Output
6 6 4 0 6
Source
dp[i][j]表示区间i~j中匹配的个数
#include<iostream>
#include<algorithm>
#include<cmath>
#include<queue>
#include<cstring>
#include<iomanip>
#define INF 0x3f3f3f3f
#define ms(a,b) memset(a,b,sizeof(a))
using namespace std;
const int maxn = 105;
char s[maxn];
int dp[maxn][maxn];
bool check(int i, int j)
{
if (s[i] == '('&&s[j] == ')') return 1;
if (s[i] == '['&&s[j] == ']') return 1;
return 0;
}
int main()
{
while (~scanf("%s", s + 1))
{
if (s[1] == 'e') break;
ms(dp, 0);
int n = strlen(s + 1);
for (int i = n; i > 0; i--)
{
for (int j = i + 1; j <= n; j++)
{
if (check(i, j)) dp[i][j] = dp[i + 1][j - 1] + 2;
for (int k = i; k <= j; k++)
dp[i][j] = max(dp[i][j], dp[i][k] + dp[k][j]);
}
}
printf("%d\n", dp[1][n]);
}
}