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Assume I have two algorithms:

for (int i = 0; i < n; i++) {
  for (int j = 0; j < n; j++) {
    //do something in constant time
  }
}

This is naturally O(n^2). Suppose I also have:

for (int i = 0; i < 100; i++) {
  for (int j = 0; j < n; j++) {
    //do something in constant time
  }
}

This is O(n) + O(n) + O(n) + O(n) + ... O(n) + = O(n)

It seems that even though my second algorithm is O(n), it will take longer. Can someone expand on this? I bring it up because I often see algorithms where they will, for example, perform a sorting step first or something like that, and when determining total complexity, its just the most complex element that bounds the algorithm.

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5  
An algorithm that belongs to O(n) can take up to c*n steps to finish, where c is some constant. So your algorithm is still O(n) for any number of constant iterations you make in the first loop. –  ChronoTrigger Mar 23 at 17:18
43  
Your understanding is correct: Big-O analysis isn't used to determine absolute resource usage, but to compare how the resource usage grows with the input size. –  amon Mar 23 at 17:18
3  
Why do you think that the second algorithm will take longer? As soon as n > 100 then the first algorithm will take longer. –  aquinas Mar 23 at 17:20
2  
See also: galactic algorithms –  harold Mar 23 at 17:22
1  
All very good answers everyone. I knew it wasn't supposed to explicitly cover runtimes, but these answers help put this dilemma in perspective. @aquinas You are right. I thought of this after posting lol. –  Brian Vanover Mar 23 at 17:23

6 Answers 6

up vote 90 down vote accepted

Actually big-O is only an upper bound, meaning you can say an O(1) algorithm (or really any algorithm taking O(n2) or less time) takes O(n2) as well. To this end, let's switch over to big-Theta (Θ) notation, which is just a tight bound. See the formal definitions for more information.

If you only know about big-O, it's likely that you've (incorrectly) been taught that big-O is a tight bound. If so, you can probably just assume big-Theta means what you've been taught big-O means.

I will, for the rest of this answer, assume you asked about (or meant) big-Theta, not big-O. If not, as already mentioned, if talking about big-O, that would rather be an "anything goes" situation - the O(n) one can be faster, the O(n2) one can be faster or they can take the same amount of time (asymptotically) - one usually can't make particularly meaningful conclusions with regard to comparing the big-O of algorithms, one can only say that, given a big-O of some algorithm, that that algorithm won't take any longer than that amount of time (asymptotically).


Asymptotic complexity (which is what both big-O and big-Theta represent) completely ignores the constant factors involved - it's only intended to give an indication of how running time will change as the size of the input gets larger.

So it's certainly possible that an Θ(n) algorithm can take longer than an Θ(n2) one for some given n - which n this will happen for will really depend on the algorithms involved - for your specific example, this will be the case for n < 100, ignoring the possibility of optimizations differing between the two.

For any two given algorithms taking Θ(n) and Θ(n2) time respectively, what you're likely to see is that either:

  • The Θ(n) algorithm is slower when n is small, then the Θ(n2) one becomes slower as n increases
    (which happens if the Θ(n) one is more complex, i.e. has higher constant factors), or
  • The Θ(n2) one is always slower.

Although it's certainly possible that the Θ(n) algorithm can be slower, then the Θ(n2) one, then the Θ(n) one again, and so on as n increases, until n gets very large, from which point onwards the Θ(n2) one will always be slower, although it's greatly unlikely to happen.


To put it in slightly more mathematical terms:

Let's say the Θ(n2) algorithm takes cn2 operations for some c.

And the Θ(n) algorithm takes dn operations for some d.

This is in line with the formal definition since we can assume this holds for n greater than 0 (i.e. for all n) and that the two functions between which the running time is lies is the same.

In line with your example, if you were to say c = 1 and d = 100, then the Θ(n) algorithm would be slower until n = 100, at which point the Θ(n2) algorithm would become slower.

(courtesy of WolframAlpha).

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12  
As a concrete example, Insertion Sort (O(n^2)) is faster than Quicksort (O(nlogn)) for small inputs, and is often used as a "base case" for small inputs. Note also that insertion sort is an interesting example of where naive asymptotic analysis can fail. It runs in O(n^2) in the worst case, but O(n) time for "mostly" sorted lists. This is because it actually runs in O(# of inversions). –  Alexis Beingessner Mar 24 at 2:31
1  
@Raphael Of course, fixed. –  Dukeling Mar 24 at 13:22
3  
@Raphael: In programming, O(n) often used as Θ(n) –  J.F. Sebastian Mar 24 at 13:33
4  
@J.F.Sebastian Then it's used in the wrong way, creating unnecessary barriers between scientists and practitioners. Just use Θ as it's usually what you (i.e. programmers) want (you should want more precise statements, but that's for another time). (The Wikipedia article suggests that this practice is wide-spread in CS. While unfortunately true, that does not make it correct: typically people who make this error are a) not aware of the facts (bad) or b) sloppy (worse).) –  Raphael Mar 24 at 14:00
2  
@Raphael It's really not particularly important, and you're dealing with semantics. A programmer wants to be able to say "my algorithm is O(whatever)." To him this means, my algorithm can be no slower than this, which is what's important. Especially since requirements may often be in O format, simply because they say "We need at LEAST this, so prove that it's O(f(n)) and we're happy". Proving theta is often superfluous. –  Cruncher Mar 24 at 20:56

Yes, an O(n) algorithm can exceed an O(n2) algorithm in terms of running time. This happens when the constant factor (that we omit in the big O notation) is large. For example, in your code above, the O(n) algorithm will have a large constant factor. So, it will perform worse than an algorithm that runs in O(n2) for n < 10.

Here, n=100 is the cross-over point. So when a task can be performed in both O(n) and in O(n2) and the constant factor of the linear algorithm is more than that of a quadratic algorithm, then we tend to prefer the algorithm with the worse running time. For example, when sorting an array, we switch to insertion sort for smaller arrays, even when merge sort or quick sort run asymptotically faster. This is because insertion sort has a smaller constant factor than merge/quick sort and will run faster.

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Thanks Nikunj. Also a great answer. I just accepted the one that came in first. –  Brian Vanover Mar 23 at 17:31
3  
It's fine. My first answer on stackoverflow that I wrote within a few minutes of the question being posted. Guess I need to improve my typing speed. –  Nikunj Banka Mar 23 at 17:33
1  
Good answer, but shouldn't n = 100 be the crossover point in the example provided by the OP? –  Derek W Mar 23 at 18:03
2  
Big-O only gives a rough idea, and determines the asymptotic behaviour. If the difference is smaller, say O (n) vs. O (n log n), the constants are much more important - one program taking 100n nanoseconds will in practice never be faster than one taking (n ln n) nanoseconds (if you calculate the crossover point, it will be some million years in the future). –  gnasher729 Mar 24 at 1:15
1  
@SørenDebois I have not forgotten the notations. The question has been edited. Earlier the OP used 10 iterations and now it has been changed to 100. The accepted answer has also been edited accordingly as you can see just 1 hour ago. I will make the necessary changes. –  Nikunj Banka Mar 24 at 9:33

Big O(n) are not meant to compare relative speed of different algorithm. They are meant to measure how fast the running time increase when the size of input increase. For example,

  • O(n) means that if n multiplied by 1000, then the running time is roughly multiplied by 1000.
  • O(n^2) means that if n is multiplied by 1000, then the running is roughly multiplied by 1000000.

So when n is large enough, any O(n) algorithm will beat a O(n^2) algorithm. It doesn't mean that anything for a fixed n.

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Long story short, yes, it can. The definition of O is base on the fact that O(f(x)) < O(g(x)) implies that g(x) will definitively take more time to run than f(x) given a big enough x.

For example, is a known fact that for small values merge sort is outperformed by insertion sort ( if I remember correctly, that should hold true for n smaller than 31)

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Yes. The O() means only asymptotic complexity. The linear algorythm can be slower as the quadratic, if it has same enough large linear slowing constant (f.e. if the core of the loop is running 10-times longer, it will be slower as its quadratic version).

The O()-notation is only an extrapolation, although a quite good one.

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2  
Something that hasn't been discussed yet is that a given algorithm might be blazingly fast once it gets going, with a small constant multiplier, but it has a huge setup time (constant, regardless of n). For very large n's, the setup time becomes insignificant, but for small n's, it could mean running more slowly than an algorithm with a "slower" O. –  Phil Perry Mar 24 at 18:45

The only guarantee you get is that—no matter the constant factors—for big enough n, the O(n) algorithm will spend fewer operations than the O(n^2) one.

As an example, let's count the operations in the OPs neat example. His two algoriths differ in only one line:

for (int i = 0; i < n; i++) {       (* A, the O(n*n) algorithm. *)

vs.

for (int i = 0; i < 100; i++) {     (* B, the O(n) algorithm. *)

Since the rest of his programs are the same, the difference in actual running times will be decided by these two lines.

  • For n=100, both lines do 100 iterations, so A and B perform exactly the same at n=100.
  • For n<100, say, n=10, A does only 10 iterations, whereas B does 100. Clearly A is faster.
  • For n>100, say, n=1000. Now the loop of A does 1000 iterations, whereas, the B loop still does its fixed 100 iterations. Clearly A is slower.

Of course, how big n has to get for the O(n) algorithm to be faster depends on the constant factor. If you change the constant 100 to 1000 in B, then the cutoff also changes to 1000.

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