Binary search tree: Difference between revisions
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# There is a tree item type with three components: | # There is a tree item type with three components: | ||
## '''''key''''' is of generic type <math>\mathcal{K}</math> | ## '''''key''''' is of generic type <math>\mathcal{K}</math>, | ||
## '''''left''''' and '''''right''''' of type "pointer to tree item of type <math>\mathcal{K}</math>" | ## '''''left''''' and '''''right''''' of type "pointer to tree item of type <math>\mathcal{K}</math>." | ||
# An object of the binary search tree type contains a pointer '''''root''''' of type "pointer to tree item of type <math>\mathcal{K}</math>" | # An object of the binary search tree type contains a pointer '''''root''''' of type "pointer to tree item of type <math>\mathcal{K}</math>" | ||
# The pointer '''''root''''' points to a well-formed binary search tree. In accordance with the definition of [[Directed Tree|directed trees]], "well-formed" means that, for any node, there is exactly one [[Basic graph definitions#Paths|path]] from the root to that node. | # The pointer '''''root''''' points to a well-formed binary search tree. In accordance with the definition of [[Directed Tree|directed trees]], "well-formed" means that, for any node, there is exactly one [[Basic graph definitions#Paths|path]] from the root to that node. |
Revision as of 14:30, 17 May 2015
General Information
Abstract data structure: Sorted sequence
Implementation invariant:
- There is a tree item type with three components:
- key is of generic type [math]\displaystyle{ \mathcal{K} }[/math],
- left and right of type "pointer to tree item of type [math]\displaystyle{ \mathcal{K} }[/math]."
- An object of the binary search tree type contains a pointer root of type "pointer to tree item of type [math]\displaystyle{ \mathcal{K} }[/math]"
- The pointer root points to a well-formed binary search tree. In accordance with the definition of directed trees, "well-formed" means that, for any node, there is exactly one path from the root to that node.
Remark
- Besides the methods of sorted sequences, binary search trees have a private method Binary Search Tree:Remove node, which receives a pointer [math]\displaystyle{ p }[/math] to a binary search tree node and removes id (possibly by removing another node and overwriting the key to be removed with the key of the other node. Prerequisite: [math]\displaystyle{ p }[/math].left [math]\displaystyle{ \neq }[/math]void.
- There are variants on binary search trees, such as AVL trees and red-black-trees, for which the height of the tree is guaranteed to be in [math]\displaystyle{ O \log{n} }[/math] in these variants (because the additional operations in these methods are necessary to maintain logarithmic height are linear in the height of the tree as well.
- The mathematical concept behind this data structure is described in the section on binary search trees of page Directed Tree.