Sorting an array based on comparison with another array of same elements in different order

Given two arrays

a[] = {1,3,2,4}
b[] = {4,2,3,1}

both will have the same numbers but in different order. We have to sort both of them. The condition is that you cannot compare elements within the same array.

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Does this make sense to anyone? – spender Sep 1 '11 at 17:17
I don't quite understand. Are you transforming b until it has the same order as a? In which case, aren't you always just returning a? – Gian Sep 1 '11 at 17:17
@spender, no, not at all. – Gian Sep 1 '11 at 17:17
If the interview questions were like this, I'd pass up the job. Really. – spender Sep 1 '11 at 17:20
Come on, this is not the weirdest interview questions at all. Just accept the reality. – Mu Qiao Sep 2 '11 at 9:23

Not sure I understood the question properly, but from my understanding the task is a follows:

Sort a given array a without comparing any two elements from a directly. However we are given a second array b which is guaranteed to contain the same elements as a but in arbitrary order. You are not allowed to modify b (otherwise just sort b and return it...).

In case the elements in a are distinct this is easy: for every element in a count how many elements in b are smaller. This number gives us the (zero based) index in a sorted order.

The case where elements are not necessarily distinct is left to the reader :)

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Right good working solution. It's O(n^2). The solutions expected was to be in O(nlogn) – shreyasva Sep 1 '11 at 17:41
Of Course you could construct a BST of b to get it to O(nlogn) but that kind of is the same as sorting b right away... – dcn Sep 1 '11 at 17:48

I'm not sure if this is cheating, but why not store the indexes of b into a. Then sort a using a fast sort, but compare b[a[x]] b[a[y]]. Then you're not comparing any two elements from a directly. When done, simply replace the index values in a with the actual values from b that they point to.

(edit after OP was edited)

If I had seen the question as it is now, my 'not the answer they really were looking for' answer would have been: Reorder b to match a by copying a to b (they have identical contents). Sort using fast algorithm of your choice, but when comparing, compare a[x] to b[y]. Make identical swaps to both arrays. You are sorting both without comparing elements from the same array.

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That's what I was going to say. – xpda Sep 2 '11 at 5:34
You are still comparing the elements within the same array. – Mu Qiao Sep 2 '11 at 6:23
Before someone edited the question to be clear and unambiguous, the answer from @dcn restated the problem so it was understandable. That is what my answer addressed, and for which it seemed a reasonable answer. Now that the original question has been modified to be readable, I see my answer does not fit its requirements. But had you seen the question and answers when I made this, a down vote seems a bit harsh. – hatchet Sep 2 '11 at 12:55

I can give you an algorithm of O(N*log(N)) time complexity based on quick sort.

1. Randomly select an element a1 in array A
2. Use a1 to partition array B, note that you only have to compare every element in array B with a1
3. Partitioning returns the position b1. Use b1 to partition array A (the same as step 2)
4. Go to step 1 for the partitioned sub-arrays if their length are greater than 1.

Time complexity: T(N) = 2*T(N/2) + O(N). So the overall complexity is O(N*log(N)) according to master theorem.

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