# Program Complexity

In the book programming interviews exposed it says, the complexity of the program below is O(N), but I dont understand how this is possible. Can someone explain ?

``````int var= 2;
for (int i=0 ; i<N ; i++) {
for (int j=i+1 ; j<N ; j*=2) {
var += var;
}
}
``````
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"It says" What says? Tell us whatever it is that you are assuming here. –  dmckee Sep 5 '12 at 17:21
I made the edit, sorry about the vagueness –  Nick Chris Sep 5 '12 at 17:26

You need a bit of math to see that. The inner loop iterates `Θ(1 + log [N/(i+1)])` times (the `1 +` is necessary since for `i >= N/2`, `[N/(i+1)] = 1` and the logarithm is 0, yet the loop iterates once). `j` takes the values `(i+1)*2^k` until it is at least as large as `N`, and

``````(i+1)*2^k >= N <=> 2^k >= N/(i+1) <=> k >= log_2 (N/(i+1))
``````

using mathematical division. So the update `j *= 2` is called `ceiling(log_2 (N/(i+1)))` times and the condition is checked `1 + ceiling(log_2 (N/(i+1)))` times. Thus we can write the total work

``````N-1                                   N
∑ (1 + log (N/(i+1)) = N + N*log N - ∑ log j
i=0                                  j=1
= N + N*log N - log N!
``````

Now, Stirling's formula tells us

``````log N! = N*log N - N + O(log N)
``````

so we find the total work done is indeed `O(N)`.

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