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How can we generate all possibilities on braces ?

N value has given to us and we have to generate all possibilities.


1) if N == 1, then only one possibility () .

2) if N==2, then possibilities are (()), ()()

3) if N==3, then possibilities are ((())), (())(),()()(), ()(()) ...

Note: left and right braces should match. I mean )( is INVALID for the N==1

Can we solve this problem by using recurrence approach ?

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you have to print all possibilities – siva Nov 30 '10 at 12:48
is this homework? – NG. Nov 30 '10 at 12:51
Yes, we can. But should we? – khachik Nov 30 '10 at 13:14

From wikipedia -

A Dyck word is a string consisting of n X's and n Y's such that no initial segment of the string has more Y's than X's (see also Dyck language). For example, the following are the Dyck words of length 6:


Re-interpreting the symbol X as an open parenthesis and Y as a close parenthesis, Cn counts the number of expressions containing n pairs of parentheses which are correctly matched:

((()))     ()(())     ()()()     (())()     (()())

See also

Abstract. A new algorithm to generate all Dyck words is presented, which is used in ranking and unranking Dyck words. We emphasize the importance of using Dyck words in encoding objects related to Catalan numbers. As a consequence of formulas used in the ranking algorithm we can obtain a recursive formula for the nth Catalan number.

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try to google for Catalan numbers

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For a given N we always have to start with an open brace. Now consider where it's corresponding closing brace is. It can be in the middle like in ()() or at the end like (()) for N=2.

Now consider N=3:

It can be at the end: (()()) and ((())).

Or in the middle: ()(()) and ()()() where it's in position 2. Then it can also be in position 4: (())().

Now we can essentially combine the 2 cases by realising the case where the closing brace is at the end is the same as it being at the middle, but with all the possibilities for N=0 added to the end.

Now to solve it you can work out all the possibilities for n between the begin and end brace and similarly you can work out all the possibilities for m after the end brace. (Note m+n+1 = N) Then you can just combine all possible combinations, append them to your list of possibilities and move on to the next possible location for the end brace.

Just be warned an easy mistake to make with these types of problems, is to find all the possibilities for i and for N-i and just combine them, but this for N=3 would double count ()()() or at least print it twice.

Here is some Python 2.x code that solves the problem:

memoise = {}
memoise[0] = [""]
memoise[1] = ["()"]

def solve(N, doprint=True):
    if N in memoise:
        return memoise[N]

    memoise[N] = []

    for i in xrange(1,N+1):
        between = solve(i-1, False)
        after   = solve(N-i, False)
        for b in between:
           for a in after:

    if doprint:
        for res in memoise[N]:
            print res

    return memoise[N]
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This is not home work and I am not school boy. This is Interview Question . – siva Dec 1 '10 at 2:40
@siva My apologies then :) – JPvdMerwe Dec 1 '10 at 11:34

Recursive solution:

import java.util.Scanner;

public class Parentheses

    static void ParCheck(int left,int right,String str)
            if (left == 0 && right == 0)

            if (left > 0)
                    ParCheck(left-1, right+1 , str + "(");
            if (right > 0)
                    ParCheck(left, right-1, str + ")");

    public static void main(String[] args)
            Scanner input=new Scanner(;
            System.out.println("Enter the  number");
            int num=input.nextInt();

            String str="";
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