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Find out the time complexity (Big Oh Bound) of the recurrence T(n) = T(⌊n⌋) + T(⌈n⌉) + 1.

How the time complexity of this comes out to be O(n)??

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Are you sure I don't forget coefficients somewhere e.g. coefficient 2 in T(⌊n/2⌋)? Your recurrence doesn't make much sense. –  pad Apr 4 '12 at 16:14
3  
This recurrence will never converge –  mbatchkarov Apr 4 '12 at 16:15
    
But we have lower bound and upper bound also in its expression –  Luv Apr 4 '12 at 16:20
    
@Luv: The upper bound and lower bound might change the value in the first call of T(n), but then T(floor(n)) = T(floor(n)) + T(ceil(n)) + 1, and as you see [and as reseter said] it will not converge. You must decrease the range in order of the recursion to converge –  amit Apr 4 '12 at 16:24
    
Those are floor and ceiling - not lower and upper bound. If n = 5, you have T(5) = T(5) + T(5) + 1 which can never be true. There has got to be a typo here. –  DRVic Apr 4 '12 at 16:24

2 Answers 2

up vote 4 down vote accepted

You probably ment T(n)=T(⌊n/2⌋)+ T(⌈n/2⌉) + 1.

Lets calculate first few values of T(n).

T(1) = 1
T(2) = 3
T(3) = 5
T(4) = 7

We can guess that T(n) = 2 * n - 1.

Lets prove that by mathematical induction

Basis

T(1) = 1
T(2) = 3
T(3) = 5
T(4) = 7

Inductive step

T(2*n) = T(⌊2*n/2⌋)+ T(⌈2*n/2⌉) + 1  
   = T(⌊n⌋)+ T(⌈n⌉) + 1 
   = (2*n - 1) + (2*n - 1) + 1 
   = 4*n - 1
   = 2 * (2*n) - 1

T(2*n+1) = T(⌊(2*n+1)/2⌋)+ T(⌈(2*n+1)/2⌉) + 1
   = T(n)+ T(n+1) + 1
   = (2*n - 1) + (2*(n+1) - 1) + 1 = 
   = 4*n + 1 =
   = (2*n+1)*2 - 1

Since both the basis and the inductive step have been proved, it has now been proved by mathematical induction that T(n) holds for all natural 2*n - 1.

T(n) = 2*n - 1 = O(n)

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+1. Really well explained! –  Priyank Bhatnagar Apr 4 '12 at 18:18

What you have currently does not make sense. Since n is usually taken to be a natural number, then n=⌊n⌋=⌈n⌉. The recurrence then reads: break down a problem of size n into two problems of size n and spend time 1 doing that. The two new problems you just created will be split in turn, and so on- all you are doing is creating more work for yourself.

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