Tree sort

(Redirected from Treesort)

A tree sort is a sort algorithm that builds a binary search tree from the elements to be sorted, and then traverses the tree (in-order) so that the elements come out in sorted order.[1] Its typical use is sorting elements online: after each insertion, the set of elements seen so far is available in sorted order.

Tree sort
ClassSorting algorithm
Data structureArray
Worst-case performanceO(n²) (unbalanced) O(n log n) (balanced)
Best-case performanceO(n log n) [citation needed]
Average performanceO(n log n)
Worst-case space complexityΘ(n)
OptimalYes, if balanced

Tree sort can be used as a one-time sort, but it is equivalent to quicksort as both recursively partition the elements based on a pivot, and since quicksort is in-place and has lower overhead, tree sort has few advantages over quicksort. It has better worst case complexity when a self-balancing tree is used, but even more overhead.

Efficiency

edit

Adding one item to a binary search tree is on average an O(log n) process (in big O notation). Adding n items is an O(n log n) process, making tree sorting a 'fast sort' process. Adding an item to an unbalanced binary tree requires O(n) time in the worst-case: When the tree resembles a linked list (degenerate tree). This results in a worst case of O(n²) time for this sorting algorithm. This worst case occurs when the algorithm operates on an already sorted set, or one that is nearly sorted, reversed or nearly reversed. Expected O(n log n) time can however be achieved by shuffling the array, but this does not help for equal items.

The worst-case behaviour can be improved by using a self-balancing binary search tree. Using such a tree, the algorithm has an O(n log n) worst-case performance, thus being degree-optimal for a comparison sort. However, tree sort algorithms require separate memory to be allocated for the tree, as opposed to in-place algorithms such as quicksort or heapsort. On most common platforms, this means that heap memory has to be used, which is a significant performance hit when compared to quicksort and heapsort[citation needed]. When using a splay tree as the binary search tree, the resulting algorithm (called splaysort) has the additional property that it is an adaptive sort, meaning that its running time is faster than O(n log n) for inputs that are nearly sorted.

Example

edit

The following tree sort algorithm in pseudocode accepts a collection of comparable items and outputs the items in ascending order:

 STRUCTURE BinaryTree
     BinaryTree:LeftSubTree
     Object:Node
     BinaryTree:RightSubTree
 
 PROCEDURE Insert(BinaryTree:searchTree, Object:item)
     IF searchTree.Node IS NULL THEN
         SET searchTree.Node TO item
     ELSE
         IF item IS LESS THAN searchTree.Node THEN
             Insert(searchTree.LeftSubTree, item)
         ELSE
             Insert(searchTree.RightSubTree, item)
 
 PROCEDURE InOrder(BinaryTree:searchTree)
     IF searchTree.Node IS NULL THEN
         EXIT PROCEDURE
     ELSE
         InOrder(searchTree.LeftSubTree)
         EMIT searchTree.Node
         InOrder(searchTree.RightSubTree)
 
 PROCEDURE TreeSort(Collection:items)
     BinaryTree:searchTree
    
     FOR EACH individualItem IN items
         Insert(searchTree, individualItem)
    
     InOrder(searchTree)

In a simple functional programming form, the algorithm (in Haskell) would look something like this:

 data Tree a = Leaf | Node (Tree a) a (Tree a)

 insert :: Ord a => a -> Tree a -> Tree a
 insert x Leaf = Node Leaf x Leaf
 insert x (Node t y s)
     | x <= y = Node (insert x t) y s
     | x > y  = Node t y (insert x s)

 flatten :: Tree a -> [a]
 flatten Leaf = []
 flatten (Node t x s) = flatten t ++ [x] ++ flatten s

 treesort :: Ord a => [a] -> [a]
 treesort = flatten . foldr insert Leaf

In the above implementation, both the insertion algorithm and the retrieval algorithm have O(n²) worst-case scenarios.

edit

References

edit
  1. ^ McLuckie, Keith; Barber, Angus (1986). "Binary Tree Sort". Sorting routines for microcomputers. Basingstoke: Macmillan. ISBN 0-333-39587-5. OCLC 12751343.