# What is the complexity of the following method?

I'm still learning about complexity measurement using the Big O Notation, was wondering if I'm correct to say that following method's complexity is O(n*log4n), where the "4" is a subscript.

``````public static void f(int n)
{
for (int i=n; i>0; i--)
{
int j = n;
while (j>0)
j = j/4;
}
}
``````
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Normally you would just write O(n log(n)), ignoring the subscript. –  Justin Ethier Jun 4 '10 at 17:08
Constants usually drop out I thought.. so you don't write O (n log 4n) you would just write O (n log n ) (if that is indeed correct) –  bwawok Jun 4 '10 at 17:09

Yes, You are correct, that the complexity of the function is `O(n*log_4(n))`

`Log_4(n) = ln(n) / ln(4)` and `ln(4)` is a constant, so if Your function has complexity `O(n*log_4(n))` it is also true, that it has a complexity of `O(n*ln(n))`

-

Did you mean

``````public static void f(int n)
{
for (int i=n; i>0; i--)
{
int j = i;  // Not j = n.
while (j>0)
j = j/4;
}
}
``````

?

In that case, too you are correct. It is O(nlogn). Using the 4 as subscript is correct too, but it only makes it more cumbersome to write.

Even with the `j=n` line, it is O(nlogn).

In fact to be more accurate you can say it is Theta(n logn).

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I don't think using the 4 as subscript is correct though, since it's the same as writing a constant: `log4(n) = log(n)/log(4)` –  IVlad Jun 4 '10 at 17:22
@IVlad: It is still correct. Like it is correct to say O(2n) or O(n^2 + 3n + 45). It is just another function, and we usually avoid constants to make it simpler to read/write/understand. Having constants in there is annoying, but not incorrect. –  Aryabhatta Jun 4 '10 at 17:24
@Moron - every text I've seen says that you do not put constants or lower degree terms in big-oh notation, so `O(2n)` is not correct and it should be `O(n)` and your second example should be `O(n^2)`. Both wikipedia and perlmonks.org/?node_id=227909 seem to suggest this: `when you see O(2N) or O(10 + 5N), someone is blending implementation details into the conceptual ones.`. Can you provide a reference that discusses this issue in more detail? –  IVlad Jun 4 '10 at 17:32
Follows from the definition of BigOh. Assume n > 0 and f is positive valued. If f <= cn^2 for some c > 0, then f <= c(n^2 + 3n + 45). i.e f = O(n^2) implies that f = O(n^2 + 3n + 45). Fortunately, f = O(n^2 + 3n + 45) also implies that f = O(n^2), so they are interchangeable and so you can drop the lower degree terms, making it easier to talk about. I agree with you that use of constants/unnecessary terms usually indicates inexperience with BigOh, but technically, it is still correct. –  Aryabhatta Jun 4 '10 at 17:41
I agree. I just wanted to point out that the definitions of the different Bachmann-Landau symbols may have some surprising results if you're not careful and for example mix up `Ο` and `Θ`. The fact that any function which is in `Ο(n×log n)` is also in `Ο(n²)` as well as `Ο(n×log₄ n)` and `Ο(n² + 3×n + 45)` is blatantly obvious from the definition, but often overlooked. In particular, many people often ask for `Ο` when they actually want `Θ` and the difference can be pretty significant. –  Jörg W Mittag Jun 4 '10 at 19:51