2

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?

8
  • I'm not sure, but I think generally n/2 >> n^1/2 so I think we could approximately consider this : T(n) = T(n/2) + n ==> T(n) = 2n
    – Lrrr
    Feb 1, 2015 at 10:36
  • How can we be sure that we still find the tight bound if we approximately consider like what u said? Thx! Feb 1, 2015 at 10:42
  • 1
    We cant, as I said I'm not sure, that was something I saw with first look
    – Lrrr
    Feb 1, 2015 at 10:48
  • Thanks Amiri, I do as what u said. Is the tight upper bound O(n)? Feb 1, 2015 at 11:15
  • I wonder if this question is more suitable for cstheory.stackexchange.com
    – NPE
    Feb 1, 2015 at 11:16

1 Answer 1

0

Ali Amiri's intuition is correct, but it's not a formal argument. Really there needs to be a base case like

T(n) = 1  for all 0 ≤ n < 9

and then we can write

 1/2
n    ≤ n/3  for all n ≥ 9

and then guess and check a nondecreasing O(n) solution for the recurrence

T'(n) = T'(n/2 + n/3) + n

and argue that T = O(T') = O(n).

0

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service and acknowledge you have read our privacy policy.

Not the answer you're looking for? Browse other questions tagged or ask your own question.