# Finding duplicate element in an array?

I saw a interview question as follows:

One number in array is duplicating.Find it

Simple solution is as follows:

``````for(int i=0;i<n;i++){
{
dup = false;
for(j=0;j<n;j++){
if(i!=j && a[i]= a[j]){
dup = true;
}

if(dup == true)
return a[i]
}
}
``````

But I want to implement it in O(n log(n)) and in O(n) time. How can i do it?

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Your title and your question don't match up. –  birryree Feb 4 '11 at 6:11
1. I don't get how looking for duplicates is the same as looking for two numbers that add up to a certain sum. 2. Shouldn't `a[i]=a[j]` be `a[i]==a[j]`? –  MAK Feb 4 '11 at 6:13
chaged question , was a copying mystake –  mindtree Feb 4 '11 at 6:24
Are you programming in C++ or Java? If your question is language-agnostic, remove language-specific tags. –  GManNickG Feb 4 '11 at 6:35
@mindtree - you should NOT change a question to something completely different like this. You've made half of the old answers irrelevant, and confused lots of people; see below. It would be better to ask your replacement as a different Question. –  Stephen C Feb 4 '11 at 6:35
show 1 more comment

Sort the array (that can be done in the first O (n Log n) then the comparison just has to be done for the adjacent elements. Or just put the array into a hash table and stop if you find the first key with an exsting entry.

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@Friedrich :can you please clarify –  mindtree Feb 4 '11 at 6:29
@GMan - the question has changed. –  Stephen C Feb 4 '11 at 6:29
i just edited my post –  mindtree Feb 4 '11 at 6:30
your initial answer was for? –  mindtree Feb 4 '11 at 6:30
@Jerry @Frie @Steph: Ah. Deleting my comment then, apologies. @mindtree: That's extremely confusing. –  GManNickG Feb 4 '11 at 6:34

I'm answering to "Finding duplicate element in an array?"

You search for i and j from 0 to < n, and later you check for j != i. Instead you could form your loops like this:

``````for (int i=0; i<n-1; i++)
{
for (j=i+1; j<n; j++)
{
if (a[i] == a[j])
{
return i;
}
}
}
return -1;
``````

Repeatedly setting dup=false is nonsense. Either dup is still false, or it was true, then you left the code with 'return'.

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Writing the previous answers in actual code (Java):

O(n log n) time:

``````    Arrays.sort(arr);
for (int i = 1; i < arr.length; i++)
if (arr[i] == arr[i - 1])
return arr[i];
throw new Exception(); // error: no duplicate
``````

O(n) time:

``````    Set<Integer> set = new HashSet<Integer>();
for (int i = 0; i < arr.length; i++) {
if (set.contains(arr[i]))
return arr[i];
}
throw new Exception(); // error: no duplicate
``````
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Hash Table based data structure might have Worst Case complexity of O(n^2) if there are collisions. Since Red Black Tree is self balancing tree the worst case complexity of Tree based data structure would be O(nlogn). –  tarun_telang Nov 24 '12 at 2:49

Reference `java.util.TreeSet` which is implemented Red-Black tree underlying, it's O(n*log(n)).

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(The question in its current form is a little confusing - my answer is assuming that the question is about finding two numbers in an array that sum to a given value)

Since the given array is unsorted, I am assuming that we are not allowed to sort the array (i.e. the given order of the array cannot be changed).

The simplest solution IMHO is to iterate over each number `x` and check if `I-x` occurs anywhere in the arrays. This is essentially what your O(n^2) solution is doing.

This can be brought down to O(n) or O(nlogn) by making the search faster using some sort of fast set data structure. Basically, as we iterate over the array, we query to see if `I-x` occurs in the set.

Code (in Python):

``````l=[1,2,3,4,5,6,7,8,9]
seen=set()

I=11
for item in l:
if I-item in seen:
print "(%d,%d)"%(item,I-item)
The complexity of the solution depends on the insert/lookup complexity of the `set` data structure that you use. A hashtable based implementation has a O(1) complexity so it gives you a O(n) algorithm, while a tree based `set` results in a O(nlogn) algorithm.
The equivalent data structure to Python's `set` would be `stl::set` in C++ and `TreeSet`/`HashSet` in Java. The line `I-x in seen` would translate to `seen.contains(I-x)` in Java and `seen.find(I-x)==seen.end()` in C++.
@mindtree: As I said in the explanation preceding the code, if a+b=X we have b=X-a. So we just check if X-a is in the set of previously encountered numbers (using the expression `I=item in seen`). –  MAK Feb 4 '11 at 8:33