Why is mergesort considered "the way to go" when sorting lists and not quicksort? I heard this in a lecture that I watched online, and saw it in a couple of websites.


2 Answers 2


One of the main sources of efficiency in quicksort is locality of reference, where the computer hardware is optimized so that accessing memory locations that are near one another tends to be faster than accessing memory locations scattered throughout memory. The partitioning step in quicksort typically has excellent locality, since it accesses consecutive array elements near the front and the back. As a result, quicksort tends to perform much better than other sorting algorithms like heapsort even though it often does roughly the same number of comparisons and swaps, since in the case of heapsort the accesses are more scattered.

Additionally, quicksort is typically much faster than other sorting algorithms because it operates in-place, without needing to create any auxiliary arrays to hold temporary values. Compared to something like merge sort, this can be a huge advantage because the time required to allocate and deallocate the auxiliary arrays can be noticeable. Operating in-place also improves quicksort's locality.

When working with linked lists, neither of these advantages necessarily applies. Because linked list cells are often scattered throughout memory, there is no locality bonus to accessing adjacent linked list cells. Consequently, one of quicksort's huge performance advantages is eaten up. Similarly, the benefits of working in-place no longer apply, since merge sort's linked list algorithm doesn't need any extra auxiliary storage space.

That said, quicksort is still very fast on linked lists. Merge sort just tends to be faster because it more evenly splits the lists in half and does less work per iteration to do a merge than to do the partitioning step.

Hope this helps!

  • In the last line of 3rd paragraph you wrote "Similarly, the benefits of working in-place no longer apply, since merge sort's linked list algorithm doesn't need any extra auxiliary storage space.". Why does it not need the auxilliary storage space?
    – Geek
    Jun 1, 2015 at 9:49
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    @Geek I probably should have said "merge sort's linked list algorithm doesn't need O(n) auxiliary storage space." The standard array-based merge algorithm requires that you allocate extra storage space in the course of doing a merge because the elements need to be moved around. In merge sort with linked lists, it's possible to move elements around without allocating an external array by simply relinking them. Jun 1, 2015 at 15:54

The cost of find() is more harmful to quicksort than mergesort.

Merge sort performs more "short range" operations on the data, making it more suitable for linked lists, whereas quicksort works better with random access data structure.

  • What do you mean by find()? Oct 3, 2011 at 0:14
  • Seeking entries in the data structure. For a linked linst you are always advancing/rewinding, like playing a tape. Oct 3, 2011 at 0:15
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    You don't need to use the random-access partition function used on arrays for quicksort in the linked list case. You can partition the linked list by iterating across the list and distributing each element into one of three lists - a "less than" list, a "greater-than" list, and an "equal list," then recursing on the latter two. You're right that the standard partition is slow, but that doesn't inherently make the linked list quicksort slow. Oct 3, 2011 at 0:18

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