I am wonder how to exactly find the tight upper bound for T(n)? for one example below:
T(n)=T( n/2 + n(1/2)) + n.
I am not that sure how to use the domain or range transform here.
I use the domain transform here.
let
n = 22k ==> n/2 = 22k-1 and n1/2 = 22k-1
After that, i do not know how to solve this kind of problem with addition in T(n). Hope someone can tell me how to solve these kind recurrences.
Thanks Ali Amiri, As what you said, I approximately consider.
T(n)=T( n/2 ) + n.
and let,
n = 2k,
==> T(2k)= T(2k-1)+ 2k
suppose ak = T(2k)
using domain transform, I get:
ak = 2kc1 + c2
hence,
T(n) = O(n).
Am I right? or still wrong?