# What's the complexity of this algorithm?

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

``````#include<iostream>
#include<algorithm>
#include<string>
#include<deque>
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)
++ana_cnt;
word = temp;
word.pop_front();
word.push_back(text[ix]);
}
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.

-
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

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.