This file and its contents are supplied under the terms of the
Common Development and Distribution License ("CDDL"), version 1.0.
You may only use this file in accordance with the terms of version
1.0 of the CDDL.

A full copy of the text of the CDDL should have accompanied this
source. A copy of the CDDL is also available via the Internet at
http://www.illumos.org/license/CDDL.


Copyright 2015 Joyent, Inc.

.Dd Dec 04, 2015 .Dt LIBAVL 3LIB .Os .Sh NAME .Nm libavl .Nd generic self-balancing binary search tree library .Sh SYNOPSIS .Lb libavl n sys/avl.h .Sh DESCRIPTION The .Nm library provides a generic implementation of AVL trees, a form of self-balancing binary tree. The interfaces provided allow for an efficient way of implementing an ordered set of data structures and, due to its embeddable nature, allow for a single instance of a data structure to belong to multiple AVL trees. .Lp Each AVL tree contains entries of a single type of data structure. Rather than allocating memory for pointers for those data structures, the storage for the tree is embedded into the data structures by declaring a member of type .Vt avl_node_t . When an AVL tree is created, through the use of .Fn avl_create , it encodes the size of the data structure, the offset of the data structure, and a comparator function which is used to compare two instances of a data structure. A data structure may be a member of multiple AVL trees by creating AVL trees which use different offsets (different members) into the data structure. .Lp AVL trees support both look up of an arbitrary item and ordered iteration over the contents of the entire tree. In addition, from any node, you can find the previous and next entries in the tree, if they exist. In addition, AVL trees support arbitrary insertion and deletion. .Ss Performance AVL trees are often used in place of linked lists. Compared to the standard, intrusive, doubly linked list, it has the following performance characteristics: l -hang -width Ds t Sy Lookup One Node d -filled -compact Lookup of a single node in a linked list is .Sy O(n) , whereas lookup of a single node in an AVL tree is .Sy O(log(n)) . .Ed t Sy Insert One Node d -filled -compact Inserting a single node into a linked list is .Sy O(1) . Inserting a single node into an AVL tree is .Sy O(log(n)) .

p Note, insertions into an AVL tree always result in an ordered tree. Insertions into a linked list do not guarantee order. If order is required, then the time to do the insertion into a linked list will depend on the time of the search algorithm being employed to find the place to insert at. .Ed t Sy Delete One Node d -filled -compact Deleting a single node from a linked list is .Sy O(1), whereas deleting a single node from an AVL tree takes .Sy O(log(n)) time. .Ed t Sy Delete All Nodes d -filled -compact Deleting all nodes from a linked list is .Sy O(n) . With an AVL tree, if using the .Xr avl_destroy_nodes 3AVL function then deleting all nodes is .Sy O(n) . However, if iterating over each entry in the tree and then removing it using a while loop, .Xr avl_first 3AVL and .Xr avl_remove 3AVL then the time to remove all nodes is .Sy O(n * log(n)). .Ed t Sy Visit the Next or Previous Node d -filled -compact Visiting the next or previous node in a linked list is .Sy O(1) , whereas going from the next to the previous node in an AVL tree will take between .Sy O(1) and .Sy O(log(n)) . .Ed .El

p In general, AVL trees are a good alternative for linked lists when order or lookup speed is important and a reasonable number of items will be present. .Sh INTERFACES The shared object .Sy libavl.so.1 provides the public interfaces defined below. See .Xr Intro(3) for additional information on shared object interfaces. Individual functions are documented in their own manual pages. l -column -offset indent ".Sy avl_is_empty" ".Sy avl_destroy_nodes" t Sy avl_add Ta Sy avl_create t Sy avl_destroy Ta Sy avl_destroy_nodes t Sy avl_find Ta Sy avl_first t Sy avl_insert Ta Sy avl_insert_here t Sy avl_is_empty Ta Sy avl_last t Sy avl_nearest Ta Sy avl_numnodes t Sy avl_remove Ta Sy avl_swap .El

p In addition, the library defines C pre-processor macros which are defined below and documented in their own manual pages.
Use the same column widths in both cases where we describe the list
of interfaces, to allow the manual page to better line up when rendered.

l -column -offset indent ".Sy avl_is_empty" ".Sy avl_destroy_nodes" t Sy AVL_NEXT Ta Sy AVL_PREV .El .Sh TYPES The .Nm library defines the following types: .Lp .Sy avl_tree_t .Lp Type used for the root of the AVL tree. Consumers define one of these for each of the different trees that they want to have. .Lp .Sy avl_node_t .Lp Type used as the data node for an AVL tree. One of these is embedded in each data structure that is the member of an AVL tree. .Lp .Sy avl_index_t .Lp Type used to locate a position in a tree. This is used with .Xr avl_find 3AVL and .Xr avl_insert 3AVL . .Sh LOCKING The .Nm library provides no locking. Callers that are using the same AVL tree from multiple threads need to provide their own synchronization. If only one thread is ever accessing or modifying the AVL tree, then there are no synchronization concerns. If multiple AVL trees exist, then they may all be used simultaneously; however, they are subject to the same rules around simultaneous access from a single thread. .Lp All routines are both .Sy Fork-safe and .Sy Async-Signal-Safe . Callers may call functions in .Nm from a signal handler and .Nm calls are all safe in face of .Xr fork 2 ; however, if callers have their own locks, then they must make sure that they are accounted for by the use of routines such as .Xr pthread_atfork 3C . .Sh EXAMPLES The following code shows examples of exercising all of the functionality that is present in .Nm . It can be compiled by using a C compiler and linking against .Nm . For example, given a file named avl.c, with gcc, one would run: d -literal $ gcc -Wall -o avl avl.c -lavl .Ed d -literal /* * Example of using AVL Trees */ #include <sys/avl.h> #include <stddef.h> #include <stdlib.h> #include <stdio.h> static avl_tree_t inttree; /* * The structure that we're storing in an AVL tree. */ typedef struct intnode { int in_val; avl_node_t in_avl; } intnode_t; static int intnode_comparator(const void *l, const void *r) { const intnode_t *li = l; const intnode_t *ri = r; if (li->in_val > ri->in_val) return (1); if (li->in_val < ri->in_val) return (-1); return (0); } /* * Create an AVL Tree */ static void create_avl(void) { avl_create(&inttree, intnode_comparator, sizeof (intnode_t), offsetof(intnode_t, in_avl)); } /* * Add entries to the tree with the avl_add function. */ static void fill_avl(void) { int i; intnode_t *inp; for (i = 0; i < 20; i++) { inp = malloc(sizeof (intnode_t)); assert(inp != NULL); inp->in_val = i; avl_add(&inttree, inp); } } /* * Find entries in the AVL tree. Note, we create an intnode_t on the * stack that we use to look this up. */ static void find_avl(void) { int i; intnode_t lookup, *inp; for (i = 10; i < 30; i++) { lookup.in_val = i; inp = avl_find(&inttree, &lookup, NULL); if (inp == NULL) { printf("Entry %d is not in the tree\\n", i); } else { printf("Entry %d is in the tree\\n", inp->in_val); } } } /* * Walk the tree forwards */ static void walk_forwards(void) { intnode_t *inp; for (inp = avl_first(&inttree); inp != NULL; inp = AVL_NEXT(&inttree, inp)) { printf("Found entry %d\\n", inp->in_val); } } /* * Walk the tree backwards. */ static void walk_backwards(void) { intnode_t *inp; for (inp = avl_last(&inttree); inp != NULL; inp = AVL_PREV(&inttree, inp)) { printf("Found entry %d\\n", inp->in_val); } } /* * Determine the number of nodes in the tree and if it is empty or * not. */ static void inttree_inspect(void) { printf("The tree is %s, there are %ld nodes in it\\n", avl_is_empty(&inttree) == B_TRUE ? "empty" : "not empty", avl_numnodes(&inttree)); } /* * Use avl_remove to remove entries from the tree. */ static void remove_nodes(void) { int i; intnode_t lookup, *inp; for (i = 0; i < 20; i+= 4) { lookup.in_val = i; inp = avl_find(&inttree, &lookup, NULL); if (inp != NULL) avl_remove(&inttree, inp); } } /* * Find the nearest nodes in the tree. */ static void nearest_nodes(void) { intnode_t lookup, *inp; avl_index_t where; lookup.in_val = 12; if (avl_find(&inttree, &lookup, &where) != NULL) abort(); inp = avl_nearest(&inttree, where, AVL_BEFORE); assert(inp != NULL); printf("closest node before 12 is: %d\\n", inp->in_val); inp = avl_nearest(&inttree, where, AVL_AFTER); assert(inp != NULL); printf("closest node after 12 is: %d\\n", inp->in_val); } static void insert_avl(void) { intnode_t lookup, *inp; avl_index_t where; lookup.in_val = 12; if (avl_find(&inttree, &lookup, &where) != NULL) abort(); inp = malloc(sizeof (intnode_t)); assert(inp != NULL); avl_insert(&inttree, inp, where); } static void swap_avl(void) { avl_tree_t swap; avl_create(&swap, intnode_comparator, sizeof (intnode_t), offsetof(intnode_t, in_avl)); avl_swap(&inttree, &swap); inttree_inspect(); avl_swap(&inttree, &swap); inttree_inspect(); } /* * Remove all remaining nodes in the tree. We first use * avl_destroy_nodes to empty the tree, then avl_destroy to finish. */ static void cleanup(void) { intnode_t *inp; void *c = NULL; while ((inp = avl_destroy_nodes(&inttree, &c)) != NULL) { free(inp); } avl_destroy(&inttree); } int main(void) { create_avl(); inttree_inspect(); fill_avl(); find_avl(); walk_forwards(); walk_backwards(); inttree_inspect(); remove_nodes(); inttree_inspect(); nearest_nodes(); insert_avl(); inttree_inspect(); swap_avl(); cleanup(); return (0); } .Ed .Sh INTERFACE STABILITY .Sy Committed .Sh MT-Level See .Sx Locking. .Sh SEE ALSO .Xr Intro 3 , .Xr pthread_atfork 3C .Lp .Xr avl_add 3AVL , .Xr avl_create 3AVL , .Xr avl_destroy 3AVL , .Xr avl_destroy_nodes 3AVL , .Xr avl_find 3AVL , .Xr avl_first 3AVL , .Xr avl_insert 3AVL , .Xr avl_insert_here 3AVL , .Xr avl_is_empty 3AVL , .Xr avl_last 3AVL , .Xr avl_nearest 3AVL , .Xr avl_numnodes 3AVL , .Xr avl_remove 3AVL , .Xr avl_swap 3AVL , .Rs .%A Adel'son-Vel'skiy, G. M. .%A Landis, Ye. M. .%T "An Algorithm for the Organization of Information" .%Q Deklady Akademii Nauk .%C USSR, Moscow .%P 263-266 .%V Vol. 16 .%N No. 2 .%D 1962 .Re