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I have a recurrence relation which is like the following:

T(n) = 2T(n/2) + log2 n

I am using recursion tree method to solve this. And at the end, i came up with the following equation:

T(n)=(2log2n)(n-1)-(1*2 + 2*22 + ... + k*2k) where k=log2n.

I am trying to find a theta notation for this equation. But i cannot find a closed formula for the sum (1*2 + 2*22 + ... + k*2k). How can i find a big theta notation for T(n)?

Thanks

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Should probably be on cs.stackexchange.com. –  Oliver Charlesworth Mar 7 '13 at 0:09
    
1*2 + 2*2^2 + ... + k*2^k = 2((k-1) 2^k + 1) –  thang Mar 7 '13 at 1:47

3 Answers 3

You should use the Master Theorem to compute your complexity, it will be much easier.

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Thank you, but my homework question explicitly wants me to use recursion tree method –  bigO Mar 7 '13 at 0:15

If you know some calculus you should be able to solve that easily.

1 + x + x^2 + ... + x^(n+1) = (x^(n+2) - 1) / (x - 1)

Multiplying by x, x + x^2 + x^3 + ... + x^(n + 2) = (x^(n + 3) - x) / (x - 1)

Differentiating the LHS will give you your series for x = 2. Differentiating the RHS will give you the closed form.

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I suppose you are doing some mistake, as per my calculations:

T(n)=(k-1)*log(n/(2^(k-1)))+2^k*T(n/2^k).

Put k=log(n)

I can post an image of my solution if you like. :)

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