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In my homework, the question asks to determine the asymptotic complexity of n^.99999*log(n). I figured that it would be closer to O( n log n) but the answer key suggests that when c > 0, log n = O(n). I'm not quite sure why that is, could someone provide an explanation?

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Where is c defined? What bearing does it have on n? –  Makoto May 18 '13 at 20:27
c is typically used to denote the hidden constant in big-O notation; f(n) = O(g(n)) if there exists constants c and N such that f(n) < c g(n) for all n > N. –  chepner May 18 '13 at 20:50

1 Answer 1

It's also true that lg n = O( nk ) (in fact, it is o(nk); did the hint actually say that, perhaps?) for any constant k, not just 1. Now consider k=0.00001. Then n0.99999 lg n = O(n0.99999 n0.00001 ) = O(n). Note that this bound is not tight, since I could choose an even smaller k, so it's perfectly fine to say that n0.99999 lg n is O(n0.99999 lg n), just as we say n lg n is O(n lg n).

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lg n = O( n^k ) for any constant k - log n = O(n^2)?? –  boisvert May 19 '13 at 12:50
Yes. You are confusing O(n^2) with Θ(n^2). Big-O merely provides an upper bound, but says nothing about the lower bound. Theta provides both upper and lower bounds. –  chepner May 19 '13 at 12:53

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