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I was asked this in an interview.

The list looks like this.

a1->bn->a2->bn-1 ... ->an->b1->NULL

Such that, a1 < a2 < ... < an


b1 < b2 < ... < bn

The interviewer put following constrains on me:

  1. You have to sort the list in place, that is you are not allowed to remove the alternate elements of a group of elements into a separate list.
  2. You have to somehow make use of the pattern that is there in the list than a naive, sorting algorithm.

I could not come up with the solution during the interview and now too. :-(

Edit : Write code in C to sort this singly linked list.

Edit2 : It was also told to me that I can borrow some idea from bubble sort and take advantage of the pattern. But it should not be a "naive" short.

I hate when interviewer puts artificial constrains but hey job is a job :-)

share|improve this question
So, what is the desired result? That the list as a whole be sorted, without distinction between the a and b elements? – Marcin May 9 '12 at 10:50
Is it a singly-linked list? – svick May 9 '12 at 10:53
Edited the question to address the comments – Saurabh May 9 '12 at 11:06
@Saurabh You haven't addressed my question. What is the desired output? – Marcin May 9 '12 at 11:08
I have. The question was already answered though : You have to sort the list in place, – Saurabh May 9 '12 at 11:10
up vote 2 down vote accepted

"You have to sort the list in place" this requirement confuses me. I'd have thought that the natural solution is:

  • by jiggering the "next" pointers in the list, create two lists. One contains the a's, and the other contains the b's, reversed.
  • do a merge on those two lists.

But I'm not sure whether the first step breaks the rule. It is "in place" as I understand the term, since it doesn't copy the nodes or their data, and in fact it doesn't move any data either. But it does remove the alternate elements into a separate list.

I can't immediately think how to combine the two steps into a single pass.

[Edit: maybe "in place" here means that we should move the data, rather than relinking the list. In which case I think the problem is harder: efficient in-place merge sort is painful enough in an array, without trying to do it (a) on a linked list, (b) with alternate elements in the wrong order]

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Steve, this was my first reaction to the problem also, but as per the interviewer it was a requirement. – Saurabh May 9 '12 at 11:07
@Saurabh: well, if you're not allowed to re-link the nodes then a linked list is just like an array without random-access. So the solution will be the same as for an array, but probably slower. – Steve Jessop May 9 '12 at 11:09
I think that is what he meant. I will accept your answer. Jeesh I am embarrassed now :D – Saurabh May 9 '12 at 11:12
I think a further improvement was to first sort the alternate elements in place which are reverse sorted. And then merge the two lists which are sorted. – Saurabh May 9 '12 at 11:16
@Saurabh: the mention of bubble sort reminds me that bubble sort is the optimal sort for an access pattern in which you can see memory through a small window that tracks forward but not backward, then starts again at the beginning (rotating drum storage). A singly-linked list is just like that, it's cheap to move forward but to move back you have to start from the beginning. I haven't yet thought of a way to optimize bubble sort for this input data thought. – Steve Jessop May 9 '12 at 11:22

In order to keep it "in place", you can first transform the list in-place to

a1 -> ... -> an -> b1 -> ... -> bn

by walking through the list and moving the b elements to the end of the list one by one.

After this, you can then move the a elements forwards one by one in a "bubble-sort fashion", i.e. scanning forwards until you find their place after the boundary that's initially before b1.

However I agree that the question is rather artificial.

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