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.

Not sure I understood the question properly, but from my understanding the task is a follows:
In case the elements in The case where elements are not necessarily distinct is left to the reader :) 

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. 


I can give you an algorithm of O(N*log(N)) time complexity based on quick sort.
Time complexity: T(N) = 2*T(N/2) + O(N). So the overall complexity is O(N*log(N)) according to master theorem. 

