# Array list algorithm - Interview

I was asked this question in an interview today. I have tried a solution but would like to know if there's a better way to solve this:

Question: I have an arraylist say of 500,000 elements such that the value of each element of the arraylist is same as the index. For ex: list.get(0) = 0; list.get(1) = 1 ...etc. But only one element is out of sync with this ordering [i.e list.get(i) != i]. How do you find that element.

My Answer: Iterate over the list using multiple threads each thread handling a certain splice of the arraylist each time comparing list.get(i) with i. When the element is found, set some boolean variable to indicate to other threads that the element has been found.

Is there a way to solve this problem without iterating over the list? Or a better way?

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With no hints about where this number might be in the list, the question is kind of boring. – keyser Apr 26 '12 at 14:21
I think you have to explain what "only one element is out of sync" really means.. it doesn't make sense.. see my answer below. I think if you move one element all the remaining elements will be out of sync, no? – duedl0r Apr 26 '12 at 14:29
@dued0r the element is not being removed. The interviewer asked how to identify the element whose value is not the same as the index. – sachinrahulsourav Apr 26 '12 at 14:54
I think it's not about to find a way to access simultaneously different areas ... it's more about reducing the data access ... – Mehdi Apr 26 '12 at 15:58

In the worst case you have to examine each element, so you can't improve on the `O(n)` time complexity.

With this in mind, the best algorithm is to scan the array list from start to finish. This way you're making best use of the available memory bandwidth.

It is not entirely clear to me how or why threading has entered the picture. It seems out of place. Was it part of the question?

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The question is quite dull this way, although I agree with your opinion. – Ziyao Wei Apr 26 '12 at 14:10
@aix No, That was my answer to the interviewer. I was thinking that using an array splice and handling the iteration of the arraylist would actually be better but i realized later that O(n) cannot be improved even with multiple threads. In fact threads will only introduce more complexity. – sachinrahulsourav Apr 26 '12 at 14:14
Though you can come at the problem from both ends of the list in the same loop. – Nick Holt Apr 26 '12 at 14:16
@NickHolt: Well, there's any number of ways in which one could try to partially unroll that loop. It would require profiling to be able to say anything meaningful about performance implications though (and of course it won't change the `O(n)`). – NPE Apr 26 '12 at 14:18
Yup, adding threads won't help if the memory I/O is the bottleneck. Most CPUs have one interface to external memory so more threads on multiple cores won't help. – Steve Kuo Apr 27 '12 at 0:17

You can't do better than `O(n)`.

And secondly, I think it's a bad idea to talk about threads and multithreading in those problems. They are not of interest at all. In the end you have a runtime of O(whatever) where your constant is removed anyway.

Maybe the interviewer meant a sorted array with elements from 0 to n-1 with index 0 to n-1. And then move one element to a different position. But that means that all the remaining elements have different indexes! In this scenario you can improve your search with binary search:

Then you can get the element in `O(log n)`. Start in the middle and check whether the index equals the element. If it is equal do the same with the upper part of the half, if not use the other part.

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I agree. And 500 000 isn't even much for a single thread to iterate through nowadays – keyser Apr 26 '12 at 14:11
Your `O(log n)` algorithm seems to fail on the list `1, 0, 2, 3, 4, 5`. Instead of move, did you mean remove? Then it works. – btilly Apr 26 '12 at 14:50
@btilly I think what he means is that if the general rule is f(n+1)=f(n)+1 (except that particular target), then a binary search is ideal here. – HelloWorld Apr 26 '12 at 17:32
@btilly: why does it fail on this list? I'll find the element 0 in O(log n).. in this case every element has a different index.. so we look for index 0... – duedl0r Apr 26 '12 at 19:16
@duedl0r I moved element 1 to element 0, but the indexes of everything else was not touched. Therefore when you look at the midpoint, you'll see that it has not changed and look in the upper half. – btilly Apr 26 '12 at 23:25

``````for (int i = 0; i < list.size / 2; i++)
{
if (i != list.get(i))
{
return i;
}
else if (list.size - i != list.get(list.size - i)
{
return list.size - i;
}
}
``````
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My view is that, in the absence of performance benchmarks loop unrolling is best left to the JIT compiler. – NPE Apr 26 '12 at 14:21
@aix yeah, I'd agree, purely in terms of readability I'd avoid doing something like this. – Nick Holt Apr 26 '12 at 14:24
``````1. iterate through the list
2. check for the condition in the elements
3. when that only element found break out the loop...
``````

I Don't think Thread Enters the Arena...

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I think we can avoid accessing all elements :

Here it's about an arithmetic : `U(n+1) = Un + 1`

We can get the sum using only the first and the Last element : `SUM = ((n+1)/2) * (U0 + Un)`

In our case `n = 500 000`

The idea was to use this sum and apply a binary Search :

We start by calculating the SUM of the right half of the table using our formula.

We will just access the first and the last element and then we access all the right half elements and calculate the real sum.

If the two SUM are different, that means that the incorrect element is here, and we can avoid the Left Half of the Table ...

Else if the Two SUM are equal that means that the incorrect element is in the other side, so we jump there and make the same thing (in that case we will just avoid a quart of the table)

.....

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suppose, we take a sample set of 1,2,3,4,5,6, the two sides have sums of 6 and 15..different sums..but tey are perfectly in order?? what you are talking about is only applicable when all the elements have same value and 1 is out of order..and also.. U(n+1) is not Un + 1..buut its Un+U – Priyanshu Jha Apr 26 '12 at 15:39
we don't compare the SUM of the different sides, we compare the theorical correct SUM and the real SUM of the same side : 0,7,2,3,4,5 Right (0,7,2): SUM = ((n+1)/2) * (U0 + Un) , n = 2, U0=0, U2 = 2; normally SUM = 3, OR SUM = 0 + 7 + 2 = 9 != 3 ===> Error Here AVOID LEFT – Mehdi Apr 26 '12 at 15:56
yeah..But then again..to compute the real sum and the theoretical sum, you have to iterate through side..maybe..the best case here will yield a less complexity but still the complexity remains same..and even bad in some cases. – Priyanshu Jha Apr 26 '12 at 15:59
I think that the idea is not about the complexity, it's about reducing the data access ... And this solution can be made by a very simple recursive method ... – Mehdi Apr 26 '12 at 16:02