# Find a[j]=j in O(log n) time

How can I find if a sorted array has an element a[j]=j in O(log n) time?(no duplicates)

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You have to visit n nodes ... –  belisarius Oct 28 '10 at 1:10
is it allowed to contain duplicate values? –  user434507 Oct 28 '10 at 1:11
@belisarius You're forgetting that the array is sorted. This is actually a very interesting problem. I think there's some way to apply binary search. –  AlcubierreDrive Oct 28 '10 at 1:12
Is this "for all j", "for any j", or "for a specific j"? Those are 3 different questions, neither of which is implicit in the given text. –  Gabe Oct 28 '10 at 1:15
It's not a well-formulated question, gotta say that. –  EboMike Oct 28 '10 at 1:19

If the array is of integers and cannot contain duplicates, you can just use binary search.

E.g. let's say we have the array:

``````a[0] == -30
a[1] == 1
a[2] == 200
a[3] == 200
a[4] == 204
a[5] == 205
a[6] == 206
a[7] == 207
``````
• First try a[floor(avg(0,7))] (i.e. a[3]). This equals 200. 200 is too big.
• So move to the lower half. Try a[floor(avg(0,2))] (i.e. a[1]). This equals 1. Hurray!

Your binary search will either successfully find some j for which a[j] == j, or it will fail by running out of places to look. Since a binary search is O(log n), you will know within that time complexity the value of j or that no such j exists.

Note that if multiple values of j satisfy the condition, you will just find an arbitrary one of them.

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@Manish, please update your question. We are not sure what you are asking. –  BobbyShaftoe Oct 28 '10 at 1:26
I thought of Binary search too by seeing log n .But imagine a scenario like this a[0]=0 a[1]=1 a[2]=2 a[3]=3 a[4]=4 a[5]=5 a[6]=6 a[7]=7 .Now if I started from a[4] I cant say that only 1 direction will have solution .Here both of them do ....I mean that I cannot always cut the input by half. But yeah if only one such instance is asked then I can say I have log n algo. –  Manish Oct 28 '10 at 1:30
@Manish, I am assuming that the OP means "does there exist any j for which a[j] == j" –  AlcubierreDrive Oct 28 '10 at 1:32
@Manish: In that case when you find a[4] = 4 you're done. You have determined that there is in fact a j such that a[j] = j, and in that particular case you've done it in O(1) time which is also O(log n) time. –  andand Oct 28 '10 at 1:37
@Jon ..Yes it does. –  Manish Oct 28 '10 at 1:38

If it can contain duplicate values, or it is a floating point array, you can't. Counterexample: a[2k]=2k+1, a[2k+1]=2k+1 or 2k+2. Worst case scenario, you have to check a[2k+1] for all k.

If it is an integer array and all values are distinct, then you do binary search. Look at a[1]-1 and a[n]-n. If they are the same sign, the answer is no. If they have different signs, look at a[n/2]-n/2. It's either zero (and then you have your answer), or one of the intervals (1,n/2) or (n/2,n) will have different signs at the ends. Take that interval and repeat.

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Could you please provide two separate counterexamples for the cases where a can contain duplicates and where a can contain floats? –  AlcubierreDrive Oct 28 '10 at 1:24
The counterexample for floats is a[2k]=2k+0.5, a[2k+1]=2k+1 or 2k+2. The point is that the binary search will only work if we're looking for a single solution or a contiguous array of solutions. If the array can contain floats or duplicates, there may be as many as n/2 disjoint solutions, and we may have to check them all by hand. –  user434507 Oct 28 '10 at 1:35
Ah, I understand now. Upvote. However, it might be a lot easier for visual learners like me to understand if you would provide full examples depicting an entire array rather than just two elems. –  AlcubierreDrive Oct 28 '10 at 1:40

Assuming duplicates are disallowed:

``````#include <stdio.h>

int
find_elt_idx_match( int *a, int lo, int hi )
{
int elt, idx;
while ( lo <= hi )
{
idx = lo + ( hi - lo ) / 2; /* Thanks, @andand */
elt = a[ idx ];
if ( elt == idx )
{
return 1;
}
if ( elt < idx )
{
lo = idx + 1;
}
else
{
hi = idx - 1;
}
}
return 0;
}

int
main( void )
{
int a[ 100 ];
/* fill a */
/* ... */
printf( "idx:elt match? %c\n", find_elt_idx_match( a, 0, 99 ) ? 'y' : 'n' );
return 0;
}
``````
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Ew, recursive solution... :x –  David Titarenco Oct 28 '10 at 2:28
@David: Touché :-) –  AugR Oct 28 '10 at 2:40
but recursion is pretty =( –  Claudiu Oct 28 '10 at 2:44
There you go +1, except what's up with the 1970s-style function notation? –  David Titarenco Oct 28 '10 at 2:45
Not to nit-pick, but idx = ( lo + hi ) / 2; can overrun the range of ints. Better to use idx = lo + (hi - lo) / 2; (ref: en.wikipedia.org/wiki/Binary_search_algorithm#Computer_usage) –  andand Oct 28 '10 at 3:22
``````public int getFirstMatchedIndex(int[] oArry)
{
int i = 0;
while(i < oArry.Length )
{
if (oArry[i] == i)
return i;
else if (oArry [i] > i)
i=oArry [i];
else
i++;

}
return -1;
}
``````
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