In computer science, an order statistic tree is a variant of the binary search tree (or more generally, a B-tree[1]) that supports two additional operations beyond insertion, lookup and deletion:
Select(i) – find the i'th smallest element stored in the tree
Rank(x) – find the rank of element x in the tree, i.e. its index in the sorted list of elements of the tree
Both operations can be performed in O(log n)worst case time when a self-balancing tree is used as the base data structure.
Augmented search tree implementation
To turn a regular search tree into an order statistic tree, the nodes of the tree need to store one additional value, which is the size of the subtree rooted at that node (i.e., the number of nodes below it). All operations that modify the tree must adjust this information to preserve the invariant that
size[x] = size[left[x]] + size[right[x]] + 1
where size[nil] = 0 by definition. Select can then be implemented as[2]: 342
function Select(t, i) // Returns the i'th element (zero-indexed) of the elements in t p ← size[left[t]]+1 if i = p return t else if i < p return Select(left[t], i) elsereturn Select(right[t], i - p)
Rank can be implemented, using the parent-function p[x], as[3]: 342
function Rank(T, x) // Returns the position of x (one-indexed) in the linear sorted list of elements of the tree T r ← size[left[x]] + 1 y ← x while y ≠ T.root if y = right[p[y]] r ← r + size[left[p[y]]] + 1 y ← p[y] return r
Order-statistic trees can be further amended with bookkeeping information to maintain balance (e.g., tree height can be added to get an order statistic AVL tree, or a color bit to get a red–black order statistic tree). Alternatively, the size field can be used in conjunction with a weight-balancing scheme at no additional storage cost.[4]
References
^"Counted B-Trees". 11 December 2004. Retrieved 18 January 2014.
^Roura, Salvador (2001). A new method for balancing binary search trees. ICALP. Lecture Notes in Computer Science. Vol. 2076. pp. 469–480. doi:10.1007/3-540-48224-5_39. ISBN978-3-540-42287-7.
External links
Order statistic tree on PineWiki, Yale University.
The Python package blist uses order statistic B-trees to implement lists with fast insertion at arbitrary positions.
February 01, 2023
order, statistic, tree, computer, science, order, statistic, tree, variant, binary, search, tree, more, generally, tree, that, supports, additional, operations, beyond, insertion, lookup, deletion, select, find, smallest, element, stored, tree, rank, find, ran. In computer science an order statistic tree is a variant of the binary search tree or more generally a B tree 1 that supports two additional operations beyond insertion lookup and deletion Select i find the i th smallest element stored in the tree Rank x find the rank of element x in the tree i e its index in the sorted list of elements of the treeBoth operations can be performed in O log n worst case time when a self balancing tree is used as the base data structure Augmented search tree implementation EditTo turn a regular search tree into an order statistic tree the nodes of the tree need to store one additional value which is the size of the subtree rooted at that node i e the number of nodes below it All operations that modify the tree must adjust this information to preserve the invariant that size x size left x size right x 1 where size nil 0 by definition Select can then be implemented as 2 342 function Select t i Returns the i th element zero indexed of the elements in t p size left t 1 if i p return t else if i lt p return Select left t i else return Select right t i p Rank can be implemented using the parent function p x as 3 342 function Rank T x Returns the position of x one indexed in the linear sorted list of elements of the tree T r size left x 1 y x while y T root if y right p y r r size left p y 1 y p y return r Order statistic trees can be further amended with bookkeeping information to maintain balance e g tree height can be added to get an order statistic AVL tree or a color bit to get a red black order statistic tree Alternatively the size field can be used in conjunction with a weight balancing scheme at no additional storage cost 4 References Edit Counted B Trees 11 December 2004 Retrieved 18 January 2014 Cormen Thomas H Leiserson Charles E Rivest Ronald L Stein Clifford 2001 1990 Introduction to Algorithms 2nd ed MIT Press and McGraw Hill ISBN 0 262 03293 7 Cormen Thomas H Leiserson Charles E Rivest Ronald L Stein Clifford 2009 1990 Introduction to Algorithms 3rd ed MIT Press and McGraw Hill ISBN 0 262 03384 4 Roura Salvador 2001 A new method for balancing binary search trees ICALP Lecture Notes in Computer Science Vol 2076 pp 469 480 doi 10 1007 3 540 48224 5 39 ISBN 978 3 540 42287 7 External links EditOrder statistic tree on PineWiki Yale University The Python package blist uses order statistic B trees to implement lists with fast insertion at arbitrary positions Retrieved from https en wikipedia org w index php title Order statistic tree amp oldid 1132628776, wikipedia, wiki, book, books, library,
