Today our professor mentioned that O(n^2) is the same as Θ(n^2).
I did not understand the explanation for that and I could not find something on the internet. Can please somebody explain it to me?
Thank you very much.
3 Answers
It is not the same. O is about upper bounds, Ω is about lower bounds, and Θ is about both upper and lower bounds.
As an example, a function f(n) = n is O(n^2), but not Θ(n^2), since we can't bound f from below by a multiple of n^2.
answered Oct 21, 2013 at 19:58
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@glglgl: For future reference, how would I type a Θ on SO? Oct 21, 2013 at 20:16
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That's not true. For example, n = O(n2) (choose c = 1, n0 = 0) but is not Θ(n2) (because limn→∞ n / n2 = 0). I suspect that you either misheard the instructor, they misspoke, or they were talking about a specific context in which it was true that didn't generalize.
Hope this helps!
answered Oct 21, 2013 at 19:57
Big O only gives an upper bound. Θ gives the lower bound as well. This SO Question should prove helpful. Your professor would be right if he said the reverse. As stated in the referenced question:
Θ(f(n)) is also O(f(n)) but not the other way around.
answered Oct 21, 2013 at 19:58
fis Big-theta(f) if it is both big-o(f) and big-omega(f) at the same thime.