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# Searching from a sorted array in less than O(log(n)) running time

I am using binary search to search a number from a sorted array of numbers in O(log(n)) time. My C function for search is as follows:

``````search(int array[],int size,int search)
{
int first=0;
int last=size-1;
int middle = (first+last)/2;
while( first <= last )
{
if ( array[middle] < search )
first = middle + 1;
else if ( array[middle] == search )
{
printf("%d found at location %d.\n", search, middle+1);
break;
}
else
last = middle - 1;

middle = (first + last)/2;
}
if ( first > last )
printf("Not found! %d is not present in the list.\n", search);
}
``````

Here `size` is the size of array and `search` is the number to search. Is there any way to perform the search in less complexity then the above program?

-
(1) `there must be a way` - why? (2) If your array is in RAM, in 32 bits systems, `log_2(n) < 32`. Is it that bad? (3) Are you looking for better asymptotic complexity [`Omega(logn)`] or an implementation with better constants? – amit Apr 27 '12 at 11:32
Standard C defines `bsearch()` which searches the array in O(log(n)) time. I believe you can't do better with comparison based search. – pmg Apr 27 '12 at 11:33
All comparisons based algorithm have a lower bound of logn. @pmg proofs have been made to back up your belief. – UmNyobe Apr 27 '12 at 11:36
Possible duplicate of this question. – Evgeny Kluev Apr 27 '12 at 11:56
Possible duplicate of stackoverflow.com/questions/8565583/… as well. – Philip Apr 27 '12 at 12:18

@UmNyobe: You can store both, a sorted array and a `hashmap:key->index`. Correct me if I miss something, but I don't think it will make other sorted array ops assymptotically slower as well. I don't think it is a good solution, but it is possible. – amit Apr 27 '12 at 11:47