Can someone explain me whether factorial(floor(log(n))) is Big O(n^c) for some constant c? And, how to prove above answer?

  • Your notation is unclear. Do you mean floor(log(factorial(n)))? Or factorial(floor(log(n)))? Or floor(factorial(log(n)))? – Mark Dickinson Feb 27 '16 at 17:59
  • Edited question title accordingly. – kartikmaji Feb 27 '16 at 18:01
  • 1
    Is this homework? What have you considered/tried already to prove this? – dgBP Feb 27 '16 at 18:11
  • I'm voting to close this question as off-topic because not about programming – Paolo Feb 27 '16 at 18:22

No. Asymptotically, we have

floor(log n)! = Ω(((log n)/3)^log n)
              = Ω(e^(log((log n) / 3)) * log n)
              = Ω(n^(log log n - log 3))

And the exponent log log n - log 3 is obviously not in O(1).

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