# split a linked list into 2 even lists containing the smallest and largest numbers

Given a linked list of integers in random order, split it into two new linked lists such that the difference in the sum of elements of each list is maximal and the length of the lists differs by no more than 1 (in the case that the original list has an odd number of elements). I can't assume that the numbers in the list are unique.

The algorithm I thought of was to do a merge sort on the original linked list (O(n·log n) time, O(n) space ) and then use a recursive function to walk to the end of the list to determine its length, doing the splitting while the recursive function is unwinding. The recursive function is O(n) time and O(n) space.

Is this the optimal solution? I can post my code if someone thinks it's relevant.

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If your linked list implementation keeps a size property, then you only have to walk half way down the list to chop it in half. (Might want to check out codereview.stackexchange.com !) –  Jeremy Heiler Feb 9 '11 at 12:48
@Jeremy Heiler: No size property, just a very plain jane basic linked list, really nothing more than a bunch of nodes linked together. –  Robert S. Barnes Feb 9 '11 at 12:52
Unless your exam requires you to implement the sort you can also use Collections.sort to do the sorting. –  karakuricoder Feb 9 '11 at 12:52
Sorry, I thought you were implementing the linked list yourself. –  Jeremy Heiler Feb 9 '11 at 12:54

No it's not optimal; you can find the median of a list in O(n), then put half of them in one list (smaller than median or equal, upto list size be n/2) and half of them in another list ((n+1)/2). Their sum difference is maximized, and there is no need to sort (O(n·log(n)). All things will be done in O(n) (space and time).

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The link you provided seems to indicate that this algorithm is suited to random access arrays. Are you sure this works for linked lists? –  Robert S. Barnes Feb 9 '11 at 13:59
@Robert S. Barnes: If necessary, we could copy the list first to an array and later back, still O(n). –  Paŭlo Ebermann Feb 9 '11 at 14:23
One more thing, based on this analysis soe.ucsc.edu/classes/cmps102/Spring05/selectAnalysis.pdf of the Median of Medians algorithm, it requires that the elements in the array be unique. I can't assume that. –  Robert S. Barnes Feb 9 '11 at 14:41
@Paŭlo Ebermann: Yeah, I thought of that right after I made the comment. –  Robert S. Barnes Feb 9 '11 at 14:42
@Robert S. Barnes, CLRS book is good for this(described it well), see table of contents mitpress.mit.edu/catalog/item/… –  Saeed Amiri Feb 22 '11 at 6:41