Description
Let us define a regular brackets sequence in the following way:
1. Empty sequence is a regular sequence.
2. If S is a regular sequence, then (S) and [S] are both regular sequences.
3. If A and B are regular sequences, then AB is a regular sequence.
For example, all of the following sequences of characters are regular brackets sequences:
(), [], (()), ([]), ()[], ()[()]
And all of the following character sequences are not:
(, [, ), )(, ([)], ([(]
Some sequence of characters '(', ')', '[', and ']' is given. You are to find the shortest possible regular brackets sequence, that contains the given character sequence as a subsequence. Here, a string a1 a2 ... an is called a subsequence of the string b1 b2 ... bm, if there exist such indices 1 = i1 < i2 < ... < in = m, that aj = bij for all 1 = j = n.
1. Empty sequence is a regular sequence.
2. If S is a regular sequence, then (S) and [S] are both regular sequences.
3. If A and B are regular sequences, then AB is a regular sequence.
For example, all of the following sequences of characters are regular brackets sequences:
(), [], (()), ([]), ()[], ()[()]
And all of the following character sequences are not:
(, [, ), )(, ([)], ([(]
Some sequence of characters '(', ')', '[', and ']' is given. You are to find the shortest possible regular brackets sequence, that contains the given character sequence as a subsequence. Here, a string a1 a2 ... an is called a subsequence of the string b1 b2 ... bm, if there exist such indices 1 = i1 < i2 < ... < in = m, that aj = bij for all 1 = j = n.
Input
The input file contains at most 100 brackets (characters '(', ')', '[' and ']') that are situated on a single line without any other characters among them.
Output
Write to the output file a single line that contains some regular brackets sequence that has the minimal possible length and contains the given sequence as a subsequence.
Sample Input
([(]
Sample Output
()[()]
题意:给你一个含括号的字符串,问你最小添加多少括号能使这个字符串的括号完全匹配。可以记录dp[i][j]为区间[i,j]中所有括号全部匹配需要的最少括号数,c[i][j]表示区间[i,j]中断开的坐标,便于待会递归输出。当i==j时,c[i][j]=-1,dp[i][j]=1;当str[i]==str[j]时,dp[i][j]=dp[i+1][j-1];再进行状态转移方程dp[i][j]=min(dp[i][j],dp[i][k]+dp[k+1][j]).同时更新c[i][j].
#include<iostream>
#include<stdio.h>
#include<stdlib.h>
#include<string.h>
#include<math.h>
#include<vector>
#include<map>
#include<set>
#include<queue>
#include<stack>
#include<string>
#include<algorithm>
using namespace std;
#define inf 99999999
int dp[106][106],c[106][106];
char str[106];
int ok(char a,char b){
if( (a=='('&&b==')') || (a=='[' && b==']'))return 1;
return 0;
}
void shuchu(int l,int r)
{
int i,j;
if(l>r)return;
if(l==r){
if(str[l]=='(' || str[l]==')')printf("()");
else printf("[]");
return;
}
if(c[l][r]!=-1){
shuchu(l,c[l][r]);
shuchu(c[l][r]+1,r);
return;
}
else{
if(str[l]=='('){
printf("(");
shuchu(l+1,r-1);
printf(")");
}
else{
printf("[");
shuchu(l+1,r-1);
printf("]");
}
return;
}
}
int main()
{
int n,m,i,j,len,len1,k,l,r;
while(gets(str)>0)
{
memset(c,-1,sizeof(c));
len1=strlen(str);
for(i=0;i<len1;i++){
dp[i][i]=1;
}
for(i=0;i<len1-1;i++){
if(ok(str[i],str[i+1]))dp[i][i+1]=0;
else {
dp[i][i+1]=2;
c[i][i+1]=i;
}
}
for(len=3;len<=len1;len++){
for(i=0;i+len-1<len1;i++){
j=i+len-1;
dp[i][j]=inf;
if(ok(str[i],str[j])){
dp[i][j]=dp[i+1][j-1];
c[i][j]=-1;
}
for(k=i;k<j;k++){
if(dp[i][j]>dp[i][k]+dp[k+1][j]){
dp[i][j]=dp[i][k]+dp[k+1][j];
c[i][j]=k;
}
}
}
}
shuchu(0,len1-1);
printf("
");
}
return 0;
}