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Am I right in saying that the time complexity in big O notation would just be O(1)?

public boolean size() {
        return (size == 0);
    }
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  • FYI size is a global variable.
    – Unfitacorn
    Nov 22, 2015 at 16:40
  • 3
    With respect to what n? Nov 22, 2015 at 16:41
  • 2
    @OliverCharlesworth has the important point here! Also, big-O notation for language constructs doesn't make any sense. Nov 22, 2015 at 16:45
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    By the way: What sense does a boolen method called size have that actually seems to check whether some size is zero (i.e. that a collection is empty)? Nov 22, 2015 at 16:47
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    @Seelenvirtuose don't you bring logic into this discussion! =)
    – Turing85
    Nov 22, 2015 at 16:50

1 Answer 1

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Am I right in saying that the time complexity in big O notation would just be O(1)?

No.

This is so common a misconception among students/pupils that I can only constantly repeat this:

Big-O notation is meant to give the complexity of something, with respect to a certain measure, over another number:

For example, saying:

"The algorithm for in-place FFT has a space requirement of O(n), with n being the number of FFT bins"

says something about how much the FFT will need in memory, observed for different lengths of the FFT.

So, you don't specify

  1. What is the thing you're actually observing? Is it the time between calling and returning from your method? Is it the comparison alone? Is "time" measured in Java bytecode instructions, or real machine cycles?
  2. What do you vary? The number of calls to your method? The variable size?
  3. What is it that you actually want to know?

I'd like to stress 3.: Computer science students often think that they know how something will behave if they just know the theoretical time complexity of an algorithm. In reality, these numbers tend to mean nothing. And I mean that. A single fetching of a variable that is not in the CPU cache can take the time of 100-10000 additions in the CPU. Calling a method just to see whether something is 0 will take a few dozen instructions if directly compiled, and might take a lot more if you're using something that is (semi-)interpreted like Java; however, in Java, the next time you call that same method, it might already be there as precompiled machine code...

Then, if your compiler is very smart, it might not only inline the function, eliminating the stack save/restore and call/return instructions, but possibly even merging the result into whatever instructions you were conditioning on that return value, which in essence means that this function, in an extreme case, might not take a single cycle to execute.

So, no matter how you put this, you can not say "time complexity in big O of something that is a language specific feature" without saying what you vary, and exactly what your platform is.

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  • Your argument is totally valid. But what you can ask instead is "What is the complexity of returning the starting memory address of a memory block of size n, as a function of n?" (which basically is, what Java does when returning an object). And here the answer is O(1).
    – Turing85
    Nov 22, 2015 at 17:28
  • @Unfitacorn with what exactly?
    – Turing85
    Nov 22, 2015 at 18:34
  • @Turing85 I'd argue that's not fully true. Yes, returning a value would take the arbitrarily defined "one basic Java operation", but what's that worth? Probably nothing, as returning a constant basic type would only in a naive JRE/JIT implementation have exactly the same overhead as passing around a freshly created mutable object. So, the generalization "it always takes the same time" doesn't really apply. Especially as I've seen for Python that for things like small ints and bools, there's only one singleton object that is created once. So O(1) is not even true if your JRE behaves similarly. Nov 22, 2015 at 19:20

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