Rikka with Parenthesis II
Time Limit: 2000/1000 MS (Java/Others) Memory Limit: 65536/65536 K (Java/Others)Total Submission(s): 2571 Accepted Submission(s): 913
Problem Description
As we know, Rikka is poor at math. Yuta is worrying about this situation, so he gives Rikka some math tasks to practice. There is one of them:
Correct parentheses sequences can be defined recursively as follows:
1.The empty string "" is a correct sequence.
2.If "X" and "Y" are correct sequences, then "XY" (the concatenation of X and Y) is a correct sequence.
3.If "X" is a correct sequence, then "(X)" is a correct sequence.
Each correct parentheses sequence can be derived using the above rules.
Examples of correct parentheses sequences include "", "()", "()()()", "(()())", and "(((())))".
Now Yuta has a parentheses sequence S, and he wants Rikka to choose two different position i,j and swap S_i,S_j.
Rikka likes correct parentheses sequence. So she wants to know if she can change S to a correct parentheses sequence after this operation.
It is too difficult for Rikka. Can you help her?
Correct parentheses sequences can be defined recursively as follows:
1.The empty string "" is a correct sequence.
2.If "X" and "Y" are correct sequences, then "XY" (the concatenation of X and Y) is a correct sequence.
3.If "X" is a correct sequence, then "(X)" is a correct sequence.
Each correct parentheses sequence can be derived using the above rules.
Examples of correct parentheses sequences include "", "()", "()()()", "(()())", and "(((())))".
Now Yuta has a parentheses sequence S, and he wants Rikka to choose two different position i,j and swap S_i,S_j.
Rikka likes correct parentheses sequence. So she wants to know if she can change S to a correct parentheses sequence after this operation.
It is too difficult for Rikka. Can you help her?
Input
The first line contains a number t(1<=t<=1000), the number of the testcases. And there are no more then 10 testcases with n>100
For each testcase, the first line contains an integers n(1<=n<=100000), the length of S. And the second line contains a string of length S which only contains ‘(’ and ‘)’.
For each testcase, the first line contains an integers n(1<=n<=100000), the length of S. And the second line contains a string of length S which only contains ‘(’ and ‘)’.
Output
For each testcase, print "Yes" or "No" in a line.
Sample Input
3 4 ())( 4 ()() 6 )))(((
Sample Output
Yes Yes No
Hint
For the second sample input, Rikka can choose (1,3) or (2,4) to swap. But do nothing is not allowed.
#include<stdio.h>
#include <map>
#include<cmath>
#include<string.h>
#include<string>
#include<algorithm>
#include<conio.h>
using namespace std;
long long n;
char zhan[1000005];
long long top;
char s[1000005];
int main()
{
int t;
scanf("%d",&t);
for(int k=0;k<t;k++)
{
top = 0;
memset(s,0,sizeof(s));
memset(zhan,0,sizeof(zhan));
scanf("%lld",&n);
scanf("%s",s);
if(n%2 == 1)
{
printf("No\n");
continue;
}
for(int i=0;i<n;i++)
{
zhan[top++] = s[i];
if(top >=2 )
{
if(zhan[top-1] == ')' && zhan[top-2] == '(')
{
top -= 2;
}
}
}
if(top == 0 && n!=2)
printf("Yes\n");
else if( top == 2&&zhan[0] ==')'&& zhan[1] == '(')
printf("Yes\n");
else if(top == 4 && zhan[0] == zhan[1]&&zhan[2] == zhan[3] && zhan[1] != zhan[2])
printf("Yes\n");
else
printf("No\n");
}
return 0;
}