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I need to show the differences between the iterative and the recursive binary search algorithms' asymptotic runtime analysis'. as far as i know, they have the same worst case complexity (O(log(n)) but in some resources it says that recursive has O(log(n)+1). I am a bit confused, can somebody help me about this situation?

I also need to improve a python recursive binary search algorithm to run in just as equal time as the iterative one. the code is written below.


def binarySearch(alist,item):
    if len(alist) == 0:
        return False
        midpoint = len(alist)/2
        if alist[midpoint] == item:
            return True
            if item<alist[midpoint]:
                return binarySearch(alist[:midpoint],item)
                return binarySearch(alist[midpoint+1:],item)
share|improve this question
Is this for class? If so, you should note it in the question. As for improving the implementation, what steps have you taken? – outis Oct 15 '11 at 19:48
this question is to understand the behaviour of the two algorithms, which will lead me to understand my homework question :) so, this is not for class directly, but will lead me to understand and answer a homework question. – minyatur Oct 15 '11 at 19:57
btw, i didn't do anything to improve, so that i am asking :) – minyatur Oct 15 '11 at 20:04
"steps" doesn't just include specific code improvements. It also includes anything you've done to work towards a solution, which shows that a) you're actively trying and b) where you're getting stuck. – outis Oct 16 '11 at 7:17
the ideas i came through is written as comments under the post above. i don't understand why are you questioning this so hardly. i said it is not a homework, i know how to ask homework questions, i read the rules. don't worry :) – minyatur Oct 16 '11 at 11:29

O(log(n) + 1) is the same as O(log(n)) -- asymptotically, they produce the same set of functions. The constant addition is ignored, just like constant multiples.

They are different in terms of usage of space -- recursive binary search will use log(n) space (because of the stack) unless the tail-calls are removed by the compiler and turned into a non-recursive definition.

Anyway, your algorithm loses out significantly in performance because slicing is very expensive (O(n)).

share|improve this answer
i understand.. how can i slice it better then? – minyatur Oct 15 '11 at 20:00
You can't slice at all. You need a way to represent a subsequence of the list, but without actually copying out all the elements. How might you do that? (I have to be obtuse because I don't know what the homework is) – Devin Jeanpierre Oct 15 '11 at 20:06
i am thinking of taking more parameters like "list, value, first,last" and change the first and last parameters at every call. what about this solution? – minyatur Oct 15 '11 at 20:19
or i might change inside of the outer else block. just to check equality of the midpoint element last but not first. – minyatur Oct 15 '11 at 20:22
@theminyatur The first change is good. The second change would make the algorithm lose correctness unless you did it right. – Devin Jeanpierre Oct 16 '11 at 4:47

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