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Can we solve this T(n) = 2T( n/2 ) + n lg n recurrence equation master theorem I am coming from a link where he is stating that we can't apply here master theorem because it doesn't satisfied any of the 3ree case condition. On the other hand he has taken a another example T(n) = 27T(n/3) + Θ(n^3 lg n) and find the closed solution theta(n^3logn) For solving this he used 2nd case of master theorem If f(n) = Θ(nlogba (lg n)k ) then T(n) ∈ Θ(nlogba (lg n)k+1) for some k >= 0 Here my confusion arises why not we can apply 2nd case here while it is completely fit in 2nd case. My thought: a = 2 , b =2; let k =1 then f(n) = theta(n^log_2 2 logn) for k= 1 so T(n) = theta(nlogn) But he as mentioned on this we can't apply master theorem I m confused why not.

Note: It is due to f(n) bcz in T(n) = 2T( n/2 ) + n lg n f(n) = nlog n and in T(n) = 27T(n/3) + Θ(n^3 lg n) *f(n) = theta(n^3log n)* Please Correct me if I am wrong here.

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link please. thanks – UmNyobe Oct 4 '12 at 11:39
Sorry I was forget to mention here is link… – Nishant Oct 4 '12 at 11:42
up vote 2 down vote accepted

Using case 2 of master theorem I find that

 T(n) = Theta( n log^2 (n))

Your link states that the case 2 of theroem is :

 f(n) = Theta( n log_b(a))

While from several other links, like the one from mit, the case is :

 f(n) = Theta( n log_b(a) log_k(n)) for k >= 0 
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Actually for case (2) he has assumed k = 0 later he has mentioned in same link for solving T(n) = 27T(n/3) + Θ(n^3 lg n) this equation – Nishant Oct 4 '12 at 11:51
at the top of this page, he use the same link the one i provided. look it up, there is the solution – UmNyobe Oct 4 '12 at 12:00

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