Question

This came up while talking to a friend and I thought I'd ask here since it's an interesting problem and would like to see other people's solutions.

The task is to write a function Brackets(int n) that prints all combinations of well-formed brackets from 1...n. For Brackets(3) the output would be

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

Answer 1

Took a crack at it.. C# also. I think this is a lot cleaner than the other C# solution above.

    public void Brackets(int n)
    {
        for (int i = 1; i <= n; i++)
        {
            Brackets("", 0, 0, i);
        }
    }
    private void Brackets(string output, int open, int close, int pairs)
    {
        if((open==pairs)&&(close==pairs))
        {
            Console.WriteLine(output);
        }
        else
        {
            if(open<pairs)
                Brackets(output + "(", open+1, close, pairs);
            if(close<open)
                Brackets(output + ")", open, close+1, pairs);
        }
    }

The recursion is taking advantage of the fact that you can never add more opening brackets than the desired number of pairs, and you can never add more closing brackets than opening brackets..

Answer 2

Common Lisp:

This doesn't print them, but does produce a list of lists of all the possible structures. My method is a bit different from the others'. It restructures the solutions to brackets(n - 1) such that they become brackets(n). My solution isn't tail recursive, but it could be made so with a little work.

Code

(defun brackets (n)
  (if (= 1 n)
      '((()))
      (loop for el in (brackets (1- n))
            when (cdr el)
            collect (cons (list (car el)) (cdr el))
            collect (list el)
            collect (cons '() el))))

Answer 3

A simple F#/OCaml solution :

let total_bracket n =
    let rec aux acc = function
        | 0, 0 -> print_string (acc ^ "\n")
        | 0, n -> aux (acc ^ ")") (0, n-1)
        | n, 0 -> aux (acc ^ "(") (n-1, 1)
        | n, c ->
                aux (acc ^ "(") (n-1, c+1);
                aux (acc ^ ")") (n,   c-1)
    in
    aux "" (n, 0)

Answer 4

def @memo brackets ( n )
    => [] if n == 0 else around( n ) ++ pre( n ) ++ post( n ) ++ [ "()" * n) ]

def @memo pre ( n )
    => map ( ( s ) => "()" ++ s, pre ( n - 1 ) ++ around ( n - 1 ) ) if n > 2 else []

def @memo post ( n )
    => map ( ( s ) => s ++ "()", post ( n - 1 ) ++ around ( n - 1 ) ) if n > 2 else []

def @memo around ( n )
    => map ( ( s ) => "(" ++ s ++ ")", brackets( n - 1 ) )

(kin, which is something like an actor model based linear python with traits. I haven't got round to implementing @memo but the above works without that optimisation)

Answer 5

Here's another F# solution, favoring elegance over efficiency, although memoization would probably lead to a relatively well performing variant.

let rec parens = function
| 0 -> [""]
| n -> [for k in 0 .. n-1 do
        for p1 in parens k do
        for p2 in parens (n-k-1) ->
          sprintf "(%s)%s" p1 p2]

Again, this only yields a list of those strings with exactly n pairs of parens (rather than at most n), but it's easy to wrap it.

Answer 6

Here is a solution in C++. The main idea that I use is that I take the output from the previous i (where i is the number of bracket pairs), and feed that as input to the next i. Then, for each string in the input, we put a bracket pair at each location in the string. New strings are added to a set in order to eliminate duplicates.

#include <iostream>
#include <set>
using namespace std;
void brackets( int n );
void brackets_aux( int x, const set<string>& input_set, set<string>& output_set );

int main() {
    int n;
    cout << "Enter n: ";
    cin >> n;
    brackets(n);
    return 0;
}

void brackets( int n ) {
    set<string>* set1 = new set<string>;
    set<string>* set2;

    for( int i = 1; i <= n; i++ ) {
        set2 = new set<string>;
        brackets_aux( i, *set1, *set2 );
        delete set1;
        set1 = set2;
    }
}

void brackets_aux( int x, const set<string>& input_set, set<string>& output_set ) {
    // Build set of bracket strings to print
    if( x == 1 ) {
        output_set.insert( "()" );
    }
    else {
        // For each input string, generate the output strings when inserting a bracket pair
        for( set<string>::iterator s = input_set.begin(); s != input_set.end(); s++ ) {
            // For each location in the string, insert bracket pair before location if valid
            for( unsigned int i = 0; i < s->size(); i++ ) {
                string s2 = *s;
                s2.insert( i, "()" );
                output_set.insert( s2 );
            }
            output_set.insert( *s + "()" );
        }
    }

    // Print them
    for( set<string>::iterator i = output_set.begin(); i != output_set.end(); i++ ) {
        cout << *i << "  ";
    }
    cout << endl;
}

Answer 7

Damn - everyone beat me to it, but I have a nice working example :)

http://www.fiveminuteargument.com/so-727707

The key is identifying the rules, which are actually quite simple:

• Build the string char-by-char
• At a given point in the string
  • if brackets in string so far balance (includes empty str), add an open bracket and recurse
  • if all open brackets have been used, add a close bracket and recurse
  • otherwise, recurse twice, once for each type of bracket
• Stop when you get to the end :-)

Answer 8

The number of possible combinations is the Catalan number of N pairs C(n).

This problem was discussed on the joelonsoftware.com forums pretty exentsively including iterative, recursive and iterative/bitshifting solutions. Some pretty cool stuff there.

Here is a quick recursive solution suggested on the forums in C#:

C#

public void Brackets(int pairs) {
    if (pairs > 1) Brackets(pairs - 1);
	char[] output = new char[2 * pairs];

	output[0] = '(';
	output[1] = ')';

	foo(output, 1, pairs - 1, pairs, pairs);
    Console.writeLine();
}

public void foo(char[] output, int index, int open, int close,
		int pairs) {
	int i;

	if (index == 2 * pairs) {
		for (i = 0; i < 2 * pairs; i++)
			Console.write(output[i]);
		Console.write('\n');
		return;
	}

	if (open != 0) {
		output[index] = '(';
		foo(output, index + 1, open - 1, close, pairs);
	}

	if ((close != 0) && (pairs - close + 1 <= pairs - open)) {
		output[index] = ')';
		foo(output, index + 1, open, close - 1, pairs);
	}

	return;
}

Brackets(3);

Output:
()
(()) ()()
((())) (()()) (())() ()(()) ()()()

Answer 9

F#:

Here is a solution that, unlike my previous solution, I believe may be correct. Also, it is more efficient.

#light

let brackets2 n =
    let result = new System.Collections.Generic.List<_>()
    let a = Array.create (n*2) '_'
    let rec helper l r diff i =
        if l=0 && r=0 then
            result.Add(new string(a))
        else
            if l > 0 then
                a.[i] <- '('
                helper (l-1) r (diff+1) (i+1)
            if diff > 0 then
                a.[i] <- ')'
                helper l (r-1) (diff-1) (i+1)
    helper n n 0 0
    result

Example:

(brackets2 4) |> Seq.iter (printfn "%s")

(*
(((())))
((()()))
((())())
((()))()
(()(()))
(()()())
(()())()
(())(())
(())()()
()((()))
()(()())
()(())()
()()(())
()()()()
*)

Answer 10

F#:

UPDATE: this answer is wrong. My N=4 misses, for example "(())(())". (Do you see why?) I will post a correct (and more efficient) algorithm shortly.

(Shame on all you up-voters, for not catching me! :) )

---

Inefficient, but short and simple. (Note that it only prints the 'nth' line; call in a loop from 1..n to get the output asked for by the question.)

#light
let rec brackets n =
    if n = 1 then
        ["()"]
    else
        [for s in brackets (n-1) do
            yield "()" ^ s
            yield "(" ^ s ^ ")"
            yield s ^ "()"]

Example:

Set.of_list (brackets 4) |> Set.iter (printfn "%s")
(*
(((())))
((()()))
((())())
((()))()
(()(()))
(()()())
(()())()
(())()()
()((()))
()(()())
()(())()
()()(())
()()()()
*)