Sign up ×
Stack Overflow is a community of 4.7 million programmers, just like you, helping each other. Join them, it only takes a minute:

Here is an algorithm counting occurrences of anagrams of one string (search_word) in the other (text):

using namespace std;

int main()
    string text = "forxxorfxdofr";
    string search_word = "for";
    deque<char> word;
    word.insert(word.begin(), text.begin(), text.begin() +  search_word.size());
    int ana_cnt = 0;

    for (int ix = 3; ix <= text.size(); ++ix)
            deque<char> temp = word;
            sort(word.begin(), word.end());
            if (string(word.begin(), word.end()) == search_word)
            word = temp;    
    cout << ana_cnt << endl;

What's the complexity of this algorithm?

I think it's O(n) algorithm, where n is the length o text. This is because the amount of time needed to execute what is inside for loop is independent of the lenght of n. However, some think it is not O(n). They say the sorting algorithm also counts when computing complexity.

share|improve this question
Its impossible that it was O(n) cos any sorting algorithm has at least O(nlogn) complexity, and you are doing that in the body of a loop, so the complexity of that algorithm is O(n^2logn) at least –  Manu343726 Sep 15 '13 at 16:09
@us2012 ok, its only other variable to consider: O(n*mlogm) which is O(n^2logn) complexity in any practical sense –  Manu343726 Sep 15 '13 at 16:13
Side remark: text.begin() + 3 should probably better be text.begin() + search_word.length(). –  dyp Sep 15 '13 at 16:19
@us2012 They are not independent. m is bounded by n, i.e. m = O(n). Therefore O(nm log m) = O(n^2 log n). So yes, you are wrong. You’d be right for Θ, but O is an upper bound. –  Konrad Rudolph Sep 15 '13 at 16:24
@us2012 You’re correct there. For that reason I intensely dislike the convention of equalling O-notation in computer science. More mathematically correct would be to use “∈” instead of “=” to make it clear that they are not equivalent. And yes, you should generally give bounds as sharply as possible. Regarding the case m>n, in a sane algorithm this would be caught with a simple check in O(1), or in the worst case after probing n characters. –  Konrad Rudolph Sep 15 '13 at 16:36

1 Answer 1

up vote 1 down vote accepted

It's O(n) if you only consider the string text with length n as input.

Proof: You're looping over ix from 3 (probably search_word.size(), isn't it?) to text.size(), so asymptotically you execute the loop body n times (since there is no break, continue or modification of ix in the loop body).

The loop body is independent of n. It sorts a queue of fixed size, namely m = search_word.size(), that is O(m log(m)) in the average case (worst case O(m^2)). As this is independent of n we're done with a total of O(n).

It's not O(n): If you want to be a little bit more precise, you'd probably count search_word with length m as input and this comes to a total of O(n m log(m)) on average, O(n m^2) in the worst case.

share|improve this answer

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.