I've seen two different formal definitions of O notation:

f(n) = O(g(n)) if there are constants n0, c where for any n0, we have f(n) < cg(n)


f(n) O(g(n)) if there are constants n0, c where for any 0, we have f(n) ≤ cg(n)

The difference is whether f(n) is strictly less than cg(n) or less than or equal to cg(n).

Are these definitions equal? If so, how do I prove it?

closed as off-topic by Wooble, Dukeling, chepner, Thorsten Dittmar, AD7six Oct 30 '13 at 14:12

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    This question appears to be off-topic because it is about computer science, not programming. use cs.stackexchange.com (where they will undoubtedly ask you what you've tried.) – Wooble Oct 26 '13 at 14:59
  • Perhaps you've misstated the problem, eg left out some ∃ marks and a spec for f. For the problem as stated, A and B need not be identical sets. For example, with f(n)=n and c = n0 = 1 and g(n)=n-1 if n>1 else 3, we have g(n0) ≮ c·f(n0) so this g is in A but not in B – James Waldby - jwpat7 Oct 26 '13 at 15:20
  • If you want to ask a different question about big-O, we'd recommend asking a separate question rather than editing this question to change the meaning. That way, if anyone wants to find this original question, they can do so. – templatetypedef Oct 31 '13 at 21:58
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    Please stop editing this question to radically change what's being asked. If you want to ask something else, please ask it separately. – templatetypedef Nov 1 '13 at 15:26

For starters, if you have that

f(n) < c g(n) for any n ≥ n0

then it is also the case that

f(n) ≤ c g(n) for any n ≥ n0.

Similarly, suppose that

f(n) ≤ c g(n) for any n ≥ n0

Supposing that g(n) ≥ 1, then you get, for any n ≥ n0, that

f(n) ≤ c g(n) ≥ cg(n) + 1 ≤ c g(n) + g(n) = (c + 1)g(n)

Therefore, using the new constant c' = c + 1, we get

f(n) < c' g(n) for any n ≥ n0

Hope this helps!

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