0

I got log n but it's not log n it is log(log n)
but why?


int function(int n){
  return aux(n , 2)
}

int aux(int n, int x){
  while (n<x) {
    x *= x;
  }
  return x;  
}

what is the complexity of function ?

5
  • 4
    Infinite. This algorithm will never terminate if n is less than 2. The code on the other hand will overflow after 5 or 6 iterations depending on your architecture. May 27, 2016 at 17:33
  • 3
    Actually, it's O(1) if n>0, because the number of operations needed to overflow x is independent of n. May 27, 2016 at 17:48
  • 2
    Shouldn't it be x < n? This is pretty weird.
    – harold
    May 27, 2016 at 17:51
  • @user3386109 No it isn't. Technically, only algorithms have big-O complexity, not actual code because all code exists and executes in a finite context where Big-O complexity has no meaning. Code is always either O(0) or O(infinite). May 27, 2016 at 18:02
  • Or you could take a practical view that big-O indicates how the running time of an algorithm varies with the value of N. If you aren't interested in the practical application of theory, then I agree with you that theory has no meaning. May 27, 2016 at 18:12

1 Answer 1

1

Pretty sure the loop condition is supposed to be n > x so I'll be assuming it in this answer.

First, observe the values of x:

x1 = x0 * x0
   = 2 * 2
   = 2^2
x2 = x1 * x1 
   = x0 * x0 * x0 * x0
   = 2 * 2 * 2 * 2
   = 2^4
x3 = x2 * x2
   = x1 * x1 * x1 * x1 
   = x0 * x0 * x0 * x0 * x0 * x0 * x0 * x0
   = 2 * 2 * 2 * 2 * 2 * 2 * 2 * 2
   = 2^8

We see that the exponent is growing as 2^t where t is the number of iterations in the loop so we can obtain the closed form equation for x:

x = 2^(2^t)

Then we can solve for the number of iterations t:

n > x
=> n > 2^(2^t)
=> log(n) > 2^t
=> log(log(n)) > t

as required.

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.