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I was given the following question on an exam and it seems as though it might not be possible. Is there something I'm missing?

Given an array of n objects which can be compared only for equality, and knowing nothing about the range of values in the array, give a divide and conquer solution for detecting the existence of any duplicates in the array. This must be an O(nlogn) solution.

We can safely assume due to the nature of the question that the solution likely has nothing to do with data structures or radix sorts, so can this be done in-place?

If so, how?

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So that is not asking for all sets of duplicates, just any duplicates (i.e. two or more objects that test equal)? –  gbulmer Apr 12 '12 at 16:46
What if all elements are different. I think you'll need to check every pair. –  kilotaras Apr 12 '12 at 16:49
@kilotaras is correct, you have to compare every pair and that's O(n^2). –  sch Apr 12 '12 at 16:54
@gbulmer Yes, we're testing for the existence of any duplicates. –  angusiguess Apr 12 '12 at 17:31
This would be doable if you could compare LessThan or similar I think, but not with only equality. –  Mooing Duck Apr 12 '12 at 18:31

5 Answers 5

up vote 6 down vote accepted

You can't check for duplicates in O(nlogn) if you can't order the items, and you can't order them if you can only compare for equality.

In fact, you can't be sure there are no duplicates unless you compare every pair, and there are n(n-1)/2 such pairs.

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... And an N(N+1)/2-complexity algorithm wouldn't really benefit from a "divide-and-conquer" approach. –  KeithS Apr 12 '12 at 18:04

How about using a hashset. Add each item to the set. Then check the size. However, this is not divide and conquer.

Would the result of comparing for equality tell you which one of the two objects being compared were 'bigger'?

If you can create a total ordering of the set of objects, I am thinking that you could use one of the inplace divide and conq sorting algorithms but add some additional logic that detects duplicates. (turn the <= check into a < and == check)

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You can only compare for equality according to the question. –  sch Apr 12 '12 at 16:52
My question about the equality check comes from the results of string equality checks, where the result is -x, 0, or x and allows you to create a totally ordered set. –  Colin D Apr 12 '12 at 16:57
String.Compare() is basically an implementation of an IComparer interface, which compares for relative magnitude, not just equality. Assume all you have access to on the objects themselves is an Equals() method accepting another object and returning true or false. –  KeithS Apr 12 '12 at 17:03
creating the hashset is itself requires checking for duplicates. –  sch Apr 12 '12 at 17:19

Since it is O(nlogn), basically you can sort the array and find duplicates. Since you want to use divide and conquer, I suggest using quicksort.

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You can't sort the array because you can only compare for equality. –  sch Apr 12 '12 at 17:14

The only way you could do it in NlogN time is to "cheat".

In .NET and in Java, any implementation of an interface, like .NET's IEquatable which exposes only an Equals() method, is also a base-level Object. Objects in .NET and Java have a hashing function (in .NET it's GetHashCode(); in Java it's hashCode()). So, no matter what methods the interface restricts you to, you always have access to a hashing function that will produce a numeric value.

That would allow you to hash each object and compare hashes for relative magnitude. That in turn allows you to sort the array by the hash, and then scan it in linear time to detect duplicates. You can do this in-place, or you can leave the original array intact by inserting each item into a red-black tree, hashtable or dictionary keyed to the hash value (all of which have logN or better access times and logN or better insertion times).

As stated in the comments, any of these approaches can be parallelized to multiple threads, allowing for the "divide-and-conquer" requirement; sorting can be done with a parallel MergeSort, while depending on the objects you have access to in your environment you could use a thread-safe "concurrent" collection, in turn allowing you to split the array into sub-arrays inserted into the collection by multiple threads. Scanning a sorted list can also be parallelized if you overlap the sub-array given to each thread by one element, preventing one item of a duplicate pair being in one subarray and the other in the next by serendipity.

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As in Colin's answer, adding the items to a dictionary (that doesn't have duplicates) is O(n) and not O(long) because they don't have an order. So your solution is still O(n^2). –  sch Apr 12 '12 at 18:10
Depends on the internal implementation. .NET's Dictionary uses a Hashtable, which is O(logN) insertion and O(1) access. That allows the built-in ContainsKey() function to operate in log(N) time. –  KeithS Apr 12 '12 at 18:18
This is right but the question specifically asks for a Divide and Conquer solution. –  Ian Bishop Apr 12 '12 at 18:18
Sorting can be accomplished with a parallelizable MergeSort, or you can parallelize the insertion into the collection by dividing the array into subarrays and using a thread-safe collection type. –  KeithS Apr 12 '12 at 18:20
Using a hash table is equivalent of saying that the items are comparable, because you can compare their hashes. Also, this is an algorithms question and implementation details should not be considered like the fact that .NET has an hash for every object. –  sch Apr 12 '12 at 18:21

Maybe there is another way to consider the analysis?

Agreed, the worst case in O(N^2). But the best case is O(1).

Looking purely at the fact that there is only equal, and the range of values is unknown, then is it fair to say there is only one way to get N^2, and that is when all the values are distinct, or unequal?

Similarly, there would be only one way to guarantee to find a duplicate in 1 test, and that is when all of the values are equal.

There are many ways that it is impossible to have to compare all objects before finding an identical pair. If there are N/2 pairs, N/3 triples, N/4 quadruples, N/sqrt(N) sets of sqrt(N) duplicates, etc., how many must be compared before finding a pair, i.e. a duplicate?

I think this is like the 'find one pair of socks by selecting from a sock draw with an unknown number of identical sets of socks, with two or more identical socks in a set'. The owner of the sock draw restocks the draw by buying unknown numbers of pairs of identical socks, and throws a sock away when it has a hole in it. We don't know how fast the socks wear out, or how fast the owner buys socks.

On average wouldn't we expect much better performance than N^2?

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Agreed; the best case is O(1) (at least the first two elements being equal) and the worst is O(N^2). But neither case is O(NlogN), and given a random set of, say, integers, you would not expect NlogN performance; you would expect on the order of O(N^2) performance even if what really happened in a particular case, or most cases, is more like O(N^2/2) or even O(N^2/1000). –  KeithS Apr 13 '12 at 2:41
@KeithS - I agree I wouldn't expect O(NlogN) to discover there are no duplicates. But when I read the question, I still wonder if it is reasonable to assume there are duplicates, and analyse that. Then there would be 1 to N/2 disjoint sets of duplicates, and each set would contain between 2 to N duplicates. How many would need to be compared before finding one pair of duplicates. If all the values are equal, best, average and worst is O(1). If there are two disjoint sets of duplicates (size N-m and m), what is the average O? Is the question looking for an inspired, No, but if we assume ...? –  gbulmer Apr 13 '12 at 10:44

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