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Can the complexity of an algorithm be at the time in O(n^2) and in O(n logn)? i am sure about this one. But what about in Ω(n^2) and in O(n logn), also and in Θ(n^2) and in Ω(n logn). Thanks

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I think you are missing an important letter when you say and in (n logn)- did you mean to put an O, an , or a Θ there before the parentheses? –  David Robinson Dec 25 '12 at 17:43
oh thanks. i meant an O –  sully11 Dec 25 '12 at 18:11

1 Answer 1

up vote 5 down vote accepted
  1. Big-O notation refers only to the upper bound. Thus, if it is in O(n log n), it is necessarily in O(n^2) (since n^2 grows faster than n log n).

  2. No, it cannot be in both Ω(n^2) and in O(n log n). That would mean "upper bounded by n log n and lower bounded by n^2, which is impossible.

  3. Θ(n^2) means it is bounded both above and below by n^2, which necessarily means it is bounded below by Ω(n log n).

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thanks, but what about in Ω(n^2) and in O(n logn) it seems correct. –  sully11 Dec 25 '12 at 18:17
@sully11: See (2) in my edited answer –  David Robinson Dec 25 '12 at 18:24
thanks for your help David –  sully11 Dec 25 '12 at 18:51

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