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I m suppose to write down an algorithm for printing out all possible combinations of given pairs of ‘<>’, I have tried to developed an algorithm to work this out but I think that’s not correct, because I do realize this problem is related to permutations [nPr] & let’s say for a given input of 5 it should create 120 combinations (5P5=120) but my code is only generating 81.

In my code have tried to generate all possible combinations by placing every element at every place one by one, but now I am little confused about how correct this approach is?

Thing is Most likely am not able to grasp the real concept of 'making subsets/combinations/permutations' (though theoretically I know what they are and how to calculate them)

I am not looking for a complete final "spoon feeded code", but something that could explain me ‘what I should be doing’, from which I could extract out the steps, understand concept and can develop my own.

If possible something extending or tweaking my current coding to achieve the right result would be easier for me to understand.

void permute()
{
    string str=”<><><>”;
    char buck=' ';
for(int a=0;a<str.length()-1;a++)
    {
        for(int b=0;b<str.length()-1;b++){
            cout<<str<<endl;
            buck=str[b];
            str[b]=str[b+1];
            str[b+1]=buck;
        }
    }
}

I have been trying to understand what I should do but i'am still struggling, any help or guidance would be really helpful. Thankyou


From 'all combinations' i mean printing out all the possible ways given set of characters can be arranged, lets say for 2 pairs '<><>' it should be like: <><>,><<>,><<>,><><,<<>>,>><< ... ... ...

share|improve this question
    
You might want to have a look at cs.sunysb.edu/~algorith/files/generating-permutations.shtml as well as 'recursively generating permutations'. –  lserni Oct 22 '12 at 11:33
2  
Could you give in example for say n=2? Im not sure what you mean exactly by all combinations of <> –  jozefg Oct 22 '12 at 11:33
    
Permuations and combinations are different things which require different algorithms. You should make it clear which one you want. –  john Oct 22 '12 at 11:36
    
Is ><><>< valid solution? If not - you have Cn(n/2) possibilities, where Cn denotes the Catalan number –  amit Oct 22 '12 at 11:36
1  
@Maven: Then you are asking for a standard permutation. There is a lot of details on it out there. Your edit clarifies it has nothing to do with the catalan number. –  amit Oct 22 '12 at 12:25

2 Answers 2

up vote 0 down vote accepted

C++ provides bool std::next_permutation(Iterator first, Iterator last) that modifies the content of (first, last) to be the next permutation in the sequence, returning true if there are more permutations, or false if this is the last permutation. The list needs to be sorted first (using std::sort(Iterator first, Iterator last)), and the sorted list forms the first permutation.

You can interact with these algorithms using str.begin() and str.end().

NOTE: Because your data set contains duplicate items, not all permutations are possible (some will be duplicates of other entries). That is:

string : permutations
-------:-------------
abcd   : 24
<><>   : 6
abcdef : 720
<><><> : 20

If you really want all permutations (including duplicates), you can have an int indices = { 0, 1, 2, 3, 4, 5 }; array which you run the permutations on and then print str[indices[0]] through str[indices[5]] for each permutation.

This could give you an insight into your algorithm and what is going wrong. That is, it can serve as a reference to compare your algorithm against.

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According to my test it has 42 solutions:

    function placeBrackets(n)
    {
        var placeBracketsRecur = function(prefix, remainingOpen, remainingClosed)
        {
            if(remainingClosed == 0)
            {
                document.write(prefix + "<br/>");
                return;
            }

            if(remainingOpen > 0)
            {
                placeBracketsRecur(prefix + "(",  remainingOpen - 1, remainingClosed);
            }

            if(remainingOpen < remainingClosed)
            {
                placeBracketsRecur(prefix + ")",  remainingOpen, remainingClosed - 1);
            }
        }

        placeBracketsRecur("", n, n);
    }

///output

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