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Given question:

A string of parentheses is said to be balanced if the left- and right-parentheses in the string can be paired off properly. For example, the strings "(())" and "()()" are both balanced, while the string "(()(" is not balanced.
Given a string S of length n consisting of parentheses, suppose you want to find the longest subsequence of S that is balanced. Using dynamic programming, design an algorithm that finds the longest balanced subsequence of S in O(n^3) time.

My approach:
Suppose given string: S[1 2 ... n]
A valid sub-sequence can end at S[i] iff S[i] == ')' i.e. S[i] is a closing brace and there exists at least one unused opening brace previous to S[i]. which could be implemented in O(N).

using namespace std;
int main(){
    string s;
    cin >> s;
    int n = s.length(), o_count = 0, len = 0;
    for(int i=0; i<n; ++i){
        if(s[i] == '('){
        else if(s[i] == ')' && o_count > 0){
    cout << len << endl;
    return 0;

I tried a couple of test cases and they seem to be working fine. Am I missing something here? If not, then how can I also design an O(n^3) Dynamic Programming solution for this problem?

This is the definition of subsequence that I'm using.


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Your program returns 2 for ()() and 3 for ()()((). Both should be 4. – John Kugelman Oct 25 '12 at 17:49
@JohnKugelman - why shouldn't the second one be 6? If his program returns the number of pairs, it returns the correct result for those 2. Multiply by 2 for the actual string length. – IVlad Oct 25 '12 at 17:52
@IVlad The balanced parentheses have to be adjacent. – John Kugelman Oct 25 '12 at 17:55
@JohnKugelman - I'm not sure what you mean. ()()() is a balanced subsequence of length 6 (3*2) of ()()((). It's also the longest balanced subsequence, and the OP's program correctly finds (half of) its length. – IVlad Oct 25 '12 at 17:57
Yes, return value is the no. of pairs in the longest sub-sequence which is properly balanced. – srbhkmr Oct 25 '12 at 18:00

1 Answer 1

up vote 1 down vote accepted

For O(n^3) DP this should work I think:

dp[i, j] = longest balanced subsequence in [i .. j]
dp[i, i] = 0
dp[i, i + 1] = 2 if [i, i + 1] == "()", 0 otherwise

dp[i, j] = max{dp[i, k] + dp[k + 1, j] : j > i + 1} in general

This can be implemented similar to how optimal matrix chain multiplication is.

Your algorithm also seems correct to me, see for example this problem:

Where the solutions are basically the same as yours.

You are only ignoring the extra brackets, so I don't see why it wouldn't work.

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Yes, I too think that DP should work. Thanks for that link I thought I was missing something with that approach. – srbhkmr Oct 25 '12 at 18:22
This answer is not correct. consider (()), the algorithm above returns 0 while it must be 4. – Nima Dec 22 '14 at 17:12
@Nima - that's correct! You can't apply the same algorithm. In that case, the OP's algorithm should do well. Unfortunately I cannot delete this answer anymore. – IVlad Dec 22 '14 at 21:31
You can find the answer for the generalized version of this question here :… – Nima Dec 23 '14 at 0:42

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