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Given two linked lists of integers. I was asked to return a linked list which contains the non-common elements. I know how to do it in O(n^2), any way to do it in O(n)?

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Is this homework? If so, please tag it as such. Also, are the input lists sorted? –  Pace Jun 18 '10 at 22:43

3 Answers 3

Use a hash table.

Iterate through the first linked list, entering the values you come across into a hash table.

Iterate through the second linked list, adding any element not found into the hash table into your list of non-common elements.

This solution should be O(n), assuming no collisions in the hash table.

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create a new empty list. have a hash table and populate it with elements of both lists. complexity n. then iterate over each list sequentially and while iterating, put those elements in the new list which are not present in the hash table. complexity n. overall complexity=n

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there would be a space complexity of n too. –  PratLee Mar 5 '13 at 16:26

If they're unsorted, then I don't believe it is possible to get better than O(n^2). However, you can do better by sorting them... you can sort in reasonably fast time, and then get something like O(nlogn) (I'm not certain that's what it would be, but I think it can be that fast if you use the right algorithm).

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It is possible to get better than O(n^2). See other solutions involving hash table. –  Jamie Wong Jun 18 '10 at 22:57
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You can do an in-place mergesort on linked lists pretty fast - asymptotically in O(n log n). So yes, sorting then diffing will solve this in O(n log n). If you're not allowed to modify the original lists, then you can copy them, which is O(n), so it's still O(n log n). –  Tom Anderson Jun 18 '10 at 23:39

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