# Logarithmic series. Lower bound [closed]

I am having some trouble, finding the lower bound for this series :

S = lg(n-2) + 2lg(n-3) + 3lg(n-4) + ... + (n-2)lg2.

The upper bound as I have figured out (and I explain below) is O (N^2 . lgN) Could you help me in finding out the lower bound on this.

My proof for the upper bound goes as :

S = lg [ (n-2)* (n-3)^2 * (n-4)^3 *.. *2^(n-2) ] = O ( lg n^(1+2+3+..+(n-1) ) = O ( n^2*log(n) )

EDIT:

Just a random thought. Can I assume the series to be closely approximated by Integral (xLogx), which happens to be O (X^2. lgX) ?? But this too, would give only an upper bound and not a lower bound.

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Stack Overflow is for programming questions. Please consider math.stackexchange.com. –  Greg Hewgill Aug 26 '11 at 19:35
It's more of a Complexity analysis, which a good programmer must be aware of. –  n0nChun Aug 26 '11 at 19:37
@n0nChun: I believe Greg meant that there's a difference between computer programming and computer science. –  Blazemonger Aug 26 '11 at 19:41
That's true, but if you want answers more specifically focused on your question, you may want to consider posting this question on a different site. Perhaps cstheory.stackexchange.com could be an option. –  Greg Hewgill Aug 26 '11 at 19:42
I agree, there. But, If the community thinks it needs to be migrated, then be it! :) –  n0nChun Aug 26 '11 at 19:43
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## closed as off topic by Greg Hewgill, Joe, Kirk Woll, svick, Neil KnightAug 26 '11 at 21:54

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