Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

If I have the following code:

IterateArray(object[] array)
{
    for(int i=0; i<array.length; i++)
    {
        Dosomething(array[i]);
    }
}

and the Dosomething(object) method's time performance is O(log n), is the overall performance of IterateArray O(n) or O(n log n)?

Thanks.

share|improve this question
    
It seems something went wrong pasting your code... –  Thorarin Jul 9 '09 at 19:51
    
Your question seems incomplete, where is the rest of the function? –  amischiefr Jul 9 '09 at 19:52

5 Answers 5

The short & somewhat wrong answer is O(n log n).

The long answer: It'd be more accurate to write it as O(n log m).

Unless DoSomething really DOES depend on the entire array, it looks like it's operating on a single element. So we distinguish this separately, using "m".

share|improve this answer
1  
+1, though I wouldn't even acknowledge O(n lg n) as an answer. There are two variables, and to express the running time in terms of just one can only be right by coincidence. –  ojrac Jul 9 '09 at 19:57
    
I'm voting this up because it is more thorough than the other answers. However, given what the OP put in the question, I'm inclined to believe the correct answer is O(n log n). That may not be what the OP meant, but it is what they said. –  rmeador Jul 9 '09 at 20:00
    
There's no real point in distinguishing constants. When it comes down to asymptotic analysis, you're not establishing any new threshold. –  AlbertoPL Jul 9 '09 at 20:06
    
@AlbertoPL: Except you don't know the scales of M and N so you can't say n log n is the asymptote. If M>>>N, then even a log. growth is something to consider. –  hythlodayr Jul 9 '09 at 20:08
    
This is a homework question, so I'm fairly confident that the complexity of DoSomething is given in the problem. Therefore, the answer is O(nlog(n)). I say shame for giving away a homework question so easily. The community should help the person think about it rather than do their homework for them. –  geowa4 Jul 9 '09 at 20:11

It would be O(n log n)

You're doing an O(log n) performance operation n times, and multiplication holds with Big O, so O(n) * O(log n) = O(n log n)

It's important to note that there really need not be any distinction between m and n if you're looking at two different sized arrays. The reason being is that m and n are both constants, and they are asymptotically equivalent if you were to graph their growth rates.

share|improve this answer
6  
Not so fast, it would be O(n log n) if it was DoSomething(array.length) instead of DoSomething(array[i]) –  Juozas Kontvainis Jul 9 '09 at 19:54
2  
The question states that Dosomething performs in log n time. Besides, I don't think passing in an integer into method call would make the difference. –  AlbertoPL Jul 9 '09 at 19:56
    
To further my point, you cannot assume anything about the Dosomething method at all, even if you were passing in an entire array versus just a single element. Of course, your example demonstrates passing in an integer. –  AlbertoPL Jul 9 '09 at 19:59
    
The n in O(n) is the size of the input. The input to DoSomething is array[i], not array. Since that could be anything (it's an object), it's wrong to assume that each invocation of DoSomething will take O(array.length). –  ojrac Jul 9 '09 at 20:01
    
Imagine that array always contains zeros, except one element is equal to array.length. Do you still claim that performance is O(n log n) in this case? –  Juozas Kontvainis Jul 9 '09 at 20:02

O( n log n )

Think about it - you're performing a log n operation n times.

share|improve this answer

For each of your m objects, if the performance of DoSomething() is O(log n), then the total performance across all of your m objects would be O(m log n).

share|improve this answer

Since the 'for' loop iterates n (say the array length is n) times and in each iteration 'Dosomething' is executed, the overall performance would be O(n logn).

cheers

share|improve this answer

Your Answer

 
discard

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