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Editorial Team
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Asked: 2026-06-18T00:15:40+00:00

I’d like to know the Big Oh for the following algorithm public List<String> getPermutations(String

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I’d like to know the Big Oh for the following algorithm

public List<String> getPermutations(String s){
    if(s.length()==1){
        List<String> base = new ArrayList<String>();
        base.add(String.valueOf(s.charAt(0)));
        return base;
    }

    List<String> combos = createPermsForCurrentChar(s.charAt(0),
                                    getPermutations(s.substring(1));

    return combos;
}
 private List<String> createPermsForCurrentChar(char a,List<String> temp){
    List<String> results = new ArrayList<String>();
    for(String tempStr : temp){
        for(int i=0;i<tempStr.length();i++){
            String prefix = tempStr.substring(0, i);


            String suffix = tempStr.substring(i);

            results.add(prefix + a + suffix);
        }


    }
    return results;
}

Heres what I think it is getPermutations is called n times , where n is length of the string.
My understanding is that
createPermutations is O(l * m) where l is the length of list temp and m is the length of each string in temp.

However since we are looking at worst case analysis, m<=n and l<= n!.
The length of the temp list keeps growing in each recursive call and so does the number of characters in each string in temp.

Does this mean that the time complexity of this algorithm is O(n * n! *n). Or is it O(n * n * n) ?

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1 Answer

  1. Editorial Team

    Well, I will just write this up as an answer instead of having a long list of comments.

    Denote the run time of getPerm on string of length n as T(n). Observe that inside getPerm, it calls getPerm(string length n-1), so clearly 

    T(n)=T(n-1) + [run time of createPerm]

    Note that createPerm has 2 loops that are nested. The outer loop iterates through the size of the result of getperm(string of length n-1) and the inner loop iterates through n-1 (length of individual strings). The result of getPerm(string of length n-1) is a list of T(n-1) strings. From this, we get that 

    [run time of createPerm] = (n-1) T(n-1)

    Substituting this into the previous equation gives

    T(n) = T(n-1) + (n-1) T(n-1) = n T(n-1)

    T(1) = 1 from the exit condition. We can just expand to find the solution (or, alternatively, use Z-transform: Can not figure out complexity of this recurrence). Since it is a simple equation, expanding is faster:

     T(n) = n T(n-1)
      = n (n-1) T(n-2)
      = n (n-1) (n-2) T(n-3) ....
      = n (n-1) ... 1
      = n!

    So T(n) = n!

    Exercise: prove this by induction! :p

    Does this make sense? Let’s think about it. We are creating permutations of n characters: http://en.wikipedia.org/wiki/Permutation.

    EDIT: note that T(n)=n! is O(n!)

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