[mirror_ubuntu-bionic-kernel.git] / Documentation / rbtree.txt

=================================
Red-black Trees (rbtree) in Linux
=================================


:Date: January 18, 2007
:Author: Rob Landley <rob@landley.net>

What are red-black trees, and what are they for?
------------------------------------------------

Red-black trees are a type of self-balancing binary search tree, used for
storing sortable key/value data pairs.  This differs from radix trees (which
are used to efficiently store sparse arrays and thus use long integer indexes
to insert/access/delete nodes) and hash tables (which are not kept sorted to
be easily traversed in order, and must be tuned for a specific size and
hash function where rbtrees scale gracefully storing arbitrary keys).

Red-black trees are similar to AVL trees, but provide faster real-time bounded
worst case performance for insertion and deletion (at most two rotations and
three rotations, respectively, to balance the tree), with slightly slower
(but still O(log n)) lookup time.

To quote Linux Weekly News:

    There are a number of red-black trees in use in the kernel.
    The deadline and CFQ I/O schedulers employ rbtrees to
    track requests; the packet CD/DVD driver does the same.
    The high-resolution timer code uses an rbtree to organize outstanding
    timer requests.  The ext3 filesystem tracks directory entries in a
    red-black tree.  Virtual memory areas (VMAs) are tracked with red-black
    trees, as are epoll file descriptors, cryptographic keys, and network
    packets in the "hierarchical token bucket" scheduler.

This document covers use of the Linux rbtree implementation.  For more
information on the nature and implementation of Red Black Trees,  see:

  Linux Weekly News article on red-black trees
    http://lwn.net/Articles/184495/

  Wikipedia entry on red-black trees
    http://en.wikipedia.org/wiki/Red-black_tree

Linux implementation of red-black trees
---------------------------------------

Linux's rbtree implementation lives in the file "lib/rbtree.c".  To use it,
"#include <linux/rbtree.h>".

The Linux rbtree implementation is optimized for speed, and thus has one
less layer of indirection (and better cache locality) than more traditional
tree implementations.  Instead of using pointers to separate rb_node and data
structures, each instance of struct rb_node is embedded in the data structure
it organizes.  And instead of using a comparison callback function pointer,
users are expected to write their own tree search and insert functions
which call the provided rbtree functions.  Locking is also left up to the
user of the rbtree code.

Creating a new rbtree
---------------------

Data nodes in an rbtree tree are structures containing a struct rb_node member::

  struct mytype {
  	struct rb_node node;
  	char *keystring;
  };

When dealing with a pointer to the embedded struct rb_node, the containing data
structure may be accessed with the standard container_of() macro.  In addition,
individual members may be accessed directly via rb_entry(node, type, member).

At the root of each rbtree is an rb_root structure, which is initialized to be
empty via:

  struct rb_root mytree = RB_ROOT;

Searching for a value in an rbtree
----------------------------------

Writing a search function for your tree is fairly straightforward: start at the
root, compare each value, and follow the left or right branch as necessary.

Example::

  struct mytype *my_search(struct rb_root *root, char *string)
  {
  	struct rb_node *node = root->rb_node;

  	while (node) {
  		struct mytype *data = container_of(node, struct mytype, node);
		int result;

		result = strcmp(string, data->keystring);

		if (result < 0)
  			node = node->rb_left;
		else if (result > 0)
  			node = node->rb_right;
		else
  			return data;
	}
	return NULL;
  }

Inserting data into an rbtree
-----------------------------

Inserting data in the tree involves first searching for the place to insert the
new node, then inserting the node and rebalancing ("recoloring") the tree.

The search for insertion differs from the previous search by finding the
location of the pointer on which to graft the new node.  The new node also
needs a link to its parent node for rebalancing purposes.

Example::

  int my_insert(struct rb_root *root, struct mytype *data)
  {
  	struct rb_node **new = &(root->rb_node), *parent = NULL;

  	/* Figure out where to put new node */
  	while (*new) {
  		struct mytype *this = container_of(*new, struct mytype, node);
  		int result = strcmp(data->keystring, this->keystring);

		parent = *new;
  		if (result < 0)
  			new = &((*new)->rb_left);
  		else if (result > 0)
  			new = &((*new)->rb_right);
  		else
  			return FALSE;
  	}

  	/* Add new node and rebalance tree. */
  	rb_link_node(&data->node, parent, new);
  	rb_insert_color(&data->node, root);

	return TRUE;
  }

Removing or replacing existing data in an rbtree
------------------------------------------------

To remove an existing node from a tree, call::

  void rb_erase(struct rb_node *victim, struct rb_root *tree);

Example::

  struct mytype *data = mysearch(&mytree, "walrus");

  if (data) {
  	rb_erase(&data->node, &mytree);
  	myfree(data);
  }

To replace an existing node in a tree with a new one with the same key, call::

  void rb_replace_node(struct rb_node *old, struct rb_node *new,
  			struct rb_root *tree);

Replacing a node this way does not re-sort the tree: If the new node doesn't
have the same key as the old node, the rbtree will probably become corrupted.

Iterating through the elements stored in an rbtree (in sort order)
------------------------------------------------------------------

Four functions are provided for iterating through an rbtree's contents in
sorted order.  These work on arbitrary trees, and should not need to be
modified or wrapped (except for locking purposes)::

  struct rb_node *rb_first(struct rb_root *tree);
  struct rb_node *rb_last(struct rb_root *tree);
  struct rb_node *rb_next(struct rb_node *node);
  struct rb_node *rb_prev(struct rb_node *node);

To start iterating, call rb_first() or rb_last() with a pointer to the root
of the tree, which will return a pointer to the node structure contained in
the first or last element in the tree.  To continue, fetch the next or previous
node by calling rb_next() or rb_prev() on the current node.  This will return
NULL when there are no more nodes left.

The iterator functions return a pointer to the embedded struct rb_node, from
which the containing data structure may be accessed with the container_of()
macro, and individual members may be accessed directly via
rb_entry(node, type, member).

Example::

  struct rb_node *node;
  for (node = rb_first(&mytree); node; node = rb_next(node))
	printk("key=%s\n", rb_entry(node, struct mytype, node)->keystring);

Cached rbtrees
--------------

Computing the leftmost (smallest) node is quite a common task for binary
search trees, such as for traversals or users relying on a the particular
order for their own logic. To this end, users can use 'struct rb_root_cached'
to optimize O(logN) rb_first() calls to a simple pointer fetch avoiding
potentially expensive tree iterations. This is done at negligible runtime
overhead for maintanence; albeit larger memory footprint.

Similar to the rb_root structure, cached rbtrees are initialized to be
empty via:

  struct rb_root_cached mytree = RB_ROOT_CACHED;

Cached rbtree is simply a regular rb_root with an extra pointer to cache the
leftmost node. This allows rb_root_cached to exist wherever rb_root does,
which permits augmented trees to be supported as well as only a few extra
interfaces:

  struct rb_node *rb_first_cached(struct rb_root_cached *tree);
  void rb_insert_color_cached(struct rb_node *, struct rb_root_cached *, bool);
  void rb_erase_cached(struct rb_node *node, struct rb_root_cached *);

Both insert and erase calls have their respective counterpart of augmented
trees:

  void rb_insert_augmented_cached(struct rb_node *node, struct rb_root_cached *,
				  bool, struct rb_augment_callbacks *);
  void rb_erase_augmented_cached(struct rb_node *, struct rb_root_cached *,
				 struct rb_augment_callbacks *);


Support for Augmented rbtrees
-----------------------------

Augmented rbtree is an rbtree with "some" additional data stored in
each node, where the additional data for node N must be a function of
the contents of all nodes in the subtree rooted at N. This data can
be used to augment some new functionality to rbtree. Augmented rbtree
is an optional feature built on top of basic rbtree infrastructure.
An rbtree user who wants this feature will have to call the augmentation
functions with the user provided augmentation callback when inserting
and erasing nodes.

C files implementing augmented rbtree manipulation must include
<linux/rbtree_augmented.h> instead of <linux/rbtree.h>. Note that
linux/rbtree_augmented.h exposes some rbtree implementations details
you are not expected to rely on; please stick to the documented APIs
there and do not include <linux/rbtree_augmented.h> from header files
either so as to minimize chances of your users accidentally relying on
such implementation details.

On insertion, the user must update the augmented information on the path
leading to the inserted node, then call rb_link_node() as usual and
rb_augment_inserted() instead of the usual rb_insert_color() call.
If rb_augment_inserted() rebalances the rbtree, it will callback into
a user provided function to update the augmented information on the
affected subtrees.

When erasing a node, the user must call rb_erase_augmented() instead of
rb_erase(). rb_erase_augmented() calls back into user provided functions
to updated the augmented information on affected subtrees.

In both cases, the callbacks are provided through struct rb_augment_callbacks.
3 callbacks must be defined:

- A propagation callback, which updates the augmented value for a given
  node and its ancestors, up to a given stop point (or NULL to update
  all the way to the root).

- A copy callback, which copies the augmented value for a given subtree
  to a newly assigned subtree root.

- A tree rotation callback, which copies the augmented value for a given
  subtree to a newly assigned subtree root AND recomputes the augmented
  information for the former subtree root.

The compiled code for rb_erase_augmented() may inline the propagation and
copy callbacks, which results in a large function, so each augmented rbtree
user should have a single rb_erase_augmented() call site in order to limit
compiled code size.


Sample usage
^^^^^^^^^^^^

Interval tree is an example of augmented rb tree. Reference -
"Introduction to Algorithms" by Cormen, Leiserson, Rivest and Stein.
More details about interval trees:

Classical rbtree has a single key and it cannot be directly used to store
interval ranges like [lo:hi] and do a quick lookup for any overlap with a new
lo:hi or to find whether there is an exact match for a new lo:hi.

However, rbtree can be augmented to store such interval ranges in a structured
way making it possible to do efficient lookup and exact match.

This "extra information" stored in each node is the maximum hi
(max_hi) value among all the nodes that are its descendants. This
information can be maintained at each node just be looking at the node
and its immediate children. And this will be used in O(log n) lookup
for lowest match (lowest start address among all possible matches)
with something like::

  struct interval_tree_node *
  interval_tree_first_match(struct rb_root *root,
			    unsigned long start, unsigned long last)
  {
	struct interval_tree_node *node;

	if (!root->rb_node)
		return NULL;
	node = rb_entry(root->rb_node, struct interval_tree_node, rb);

	while (true) {
		if (node->rb.rb_left) {
			struct interval_tree_node *left =
				rb_entry(node->rb.rb_left,
					 struct interval_tree_node, rb);
			if (left->__subtree_last >= start) {
				/*
				 * Some nodes in left subtree satisfy Cond2.
				 * Iterate to find the leftmost such node N.
				 * If it also satisfies Cond1, that's the match
				 * we are looking for. Otherwise, there is no
				 * matching interval as nodes to the right of N
				 * can't satisfy Cond1 either.
				 */
				node = left;
				continue;
			}
		}
		if (node->start <= last) {		/* Cond1 */
			if (node->last >= start)	/* Cond2 */
				return node;	/* node is leftmost match */
			if (node->rb.rb_right) {
				node = rb_entry(node->rb.rb_right,
					struct interval_tree_node, rb);
				if (node->__subtree_last >= start)
					continue;
			}
		}
		return NULL;	/* No match */
	}
  }

Insertion/removal are defined using the following augmented callbacks::

  static inline unsigned long
  compute_subtree_last(struct interval_tree_node *node)
  {
	unsigned long max = node->last, subtree_last;
	if (node->rb.rb_left) {
		subtree_last = rb_entry(node->rb.rb_left,
			struct interval_tree_node, rb)->__subtree_last;
		if (max < subtree_last)
			max = subtree_last;
	}
	if (node->rb.rb_right) {
		subtree_last = rb_entry(node->rb.rb_right,
			struct interval_tree_node, rb)->__subtree_last;
		if (max < subtree_last)
			max = subtree_last;
	}
	return max;
  }

  static void augment_propagate(struct rb_node *rb, struct rb_node *stop)
  {
	while (rb != stop) {
		struct interval_tree_node *node =
			rb_entry(rb, struct interval_tree_node, rb);
		unsigned long subtree_last = compute_subtree_last(node);
		if (node->__subtree_last == subtree_last)
			break;
		node->__subtree_last = subtree_last;
		rb = rb_parent(&node->rb);
	}
  }

  static void augment_copy(struct rb_node *rb_old, struct rb_node *rb_new)
  {
	struct interval_tree_node *old =
		rb_entry(rb_old, struct interval_tree_node, rb);
	struct interval_tree_node *new =
		rb_entry(rb_new, struct interval_tree_node, rb);

	new->__subtree_last = old->__subtree_last;
  }

  static void augment_rotate(struct rb_node *rb_old, struct rb_node *rb_new)
  {
	struct interval_tree_node *old =
		rb_entry(rb_old, struct interval_tree_node, rb);
	struct interval_tree_node *new =
		rb_entry(rb_new, struct interval_tree_node, rb);

	new->__subtree_last = old->__subtree_last;
	old->__subtree_last = compute_subtree_last(old);
  }

  static const struct rb_augment_callbacks augment_callbacks = {
	augment_propagate, augment_copy, augment_rotate
  };

  void interval_tree_insert(struct interval_tree_node *node,
			    struct rb_root *root)
  {
	struct rb_node **link = &root->rb_node, *rb_parent = NULL;
	unsigned long start = node->start, last = node->last;
	struct interval_tree_node *parent;

	while (*link) {
		rb_parent = *link;
		parent = rb_entry(rb_parent, struct interval_tree_node, rb);
		if (parent->__subtree_last < last)
			parent->__subtree_last = last;
		if (start < parent->start)
			link = &parent->rb.rb_left;
		else
			link = &parent->rb.rb_right;
	}

	node->__subtree_last = last;
	rb_link_node(&node->rb, rb_parent, link);
	rb_insert_augmented(&node->rb, root, &augment_callbacks);
  }

  void interval_tree_remove(struct interval_tree_node *node,
			    struct rb_root *root)
  {
	rb_erase_augmented(&node->rb, root, &augment_callbacks);
  }
Commit	Line	Data
ce0f95a5	1	=================================
c742b531	2	Red-black Trees (rbtree) in Linux
ce0f95a5 MCC	3	=================================
	4
	5
	6	:Date: January 18, 2007
	7	:Author: Rob Landley <rob@landley.net>
c742b531 RL	8
	9	What are red-black trees, and what are they for?
	10	------------------------------------------------
	11
	12	Red-black trees are a type of self-balancing binary search tree, used for
	13	storing sortable key/value data pairs. This differs from radix trees (which
	14	are used to efficiently store sparse arrays and thus use long integer indexes
	15	to insert/access/delete nodes) and hash tables (which are not kept sorted to
	16	be easily traversed in order, and must be tuned for a specific size and
	17	hash function where rbtrees scale gracefully storing arbitrary keys).
	18
	19	Red-black trees are similar to AVL trees, but provide faster real-time bounded
	20	worst case performance for insertion and deletion (at most two rotations and
	21	three rotations, respectively, to balance the tree), with slightly slower
	22	(but still O(log n)) lookup time.
	23
	24	To quote Linux Weekly News:
	25
	26	There are a number of red-black trees in use in the kernel.
17a9e7bb RD	27	The deadline and CFQ I/O schedulers employ rbtrees to
17a9e7bb RD	28	track requests; the packet CD/DVD driver does the same.
c742b531 RL	29	The high-resolution timer code uses an rbtree to organize outstanding
	30	timer requests. The ext3 filesystem tracks directory entries in a
	31	red-black tree. Virtual memory areas (VMAs) are tracked with red-black
	32	trees, as are epoll file descriptors, cryptographic keys, and network
	33	packets in the "hierarchical token bucket" scheduler.
	34
	35	This document covers use of the Linux rbtree implementation. For more
	36	information on the nature and implementation of Red Black Trees, see:
	37
	38	Linux Weekly News article on red-black trees
	39	http://lwn.net/Articles/184495/
	40
	41	Wikipedia entry on red-black trees
	42	http://en.wikipedia.org/wiki/Red-black_tree
	43
	44	Linux implementation of red-black trees
	45	---------------------------------------
	46
	47	Linux's rbtree implementation lives in the file "lib/rbtree.c". To use it,
	48	"#include <linux/rbtree.h>".
	49
	50	The Linux rbtree implementation is optimized for speed, and thus has one
	51	less layer of indirection (and better cache locality) than more traditional
	52	tree implementations. Instead of using pointers to separate rb_node and data
	53	structures, each instance of struct rb_node is embedded in the data structure
	54	it organizes. And instead of using a comparison callback function pointer,
	55	users are expected to write their own tree search and insert functions
	56	which call the provided rbtree functions. Locking is also left up to the
	57	user of the rbtree code.
	58
	59	Creating a new rbtree
	60	---------------------
	61
ce0f95a5	62	Data nodes in an rbtree tree are structures containing a struct rb_node member::
c742b531 RL	63
	64	struct mytype {
	65	struct rb_node node;
	66	char *keystring;
	67	};
	68
	69	When dealing with a pointer to the embedded struct rb_node, the containing data
	70	structure may be accessed with the standard container_of() macro. In addition,
	71	individual members may be accessed directly via rb_entry(node, type, member).
	72
	73	At the root of each rbtree is an rb_root structure, which is initialized to be
	74	empty via:
	75
	76	struct rb_root mytree = RB_ROOT;
	77
	78	Searching for a value in an rbtree
	79	----------------------------------
	80
	81	Writing a search function for your tree is fairly straightforward: start at the
	82	root, compare each value, and follow the left or right branch as necessary.
	83
ce0f95a5	84	Example::
c742b531 RL	85
	86	struct mytype my_search(struct rb_root root, char *string)
	87	{
	88	struct rb_node *node = root->rb_node;
	89
	90	while (node) {
	91	struct mytype *data = container_of(node, struct mytype, node);
	92	int result;
	93
	94	result = strcmp(string, data->keystring);
	95
	96	if (result < 0)
	97	node = node->rb_left;
	98	else if (result > 0)
	99	node = node->rb_right;
	100	else
	101	return data;
	102	}
	103	return NULL;
	104	}
	105
	106	Inserting data into an rbtree
	107	-----------------------------
	108
	109	Inserting data in the tree involves first searching for the place to insert the
	110	new node, then inserting the node and rebalancing ("recoloring") the tree.
	111
	112	The search for insertion differs from the previous search by finding the
	113	location of the pointer on which to graft the new node. The new node also
	114	needs a link to its parent node for rebalancing purposes.
	115
ce0f95a5	116	Example::
c742b531 RL	117
	118	int my_insert(struct rb_root root, struct mytype data)
	119	{
	120	struct rb_node *new = &(root->rb_node), parent = NULL;
	121
	122	/* Figure out where to put new node */
	123	while (*new) {
	124	struct mytype this = container_of(new, struct mytype, node);
	125	int result = strcmp(data->keystring, this->keystring);
	126
	127	parent = *new;
	128	if (result < 0)
	129	new = &((*new)->rb_left);
	130	else if (result > 0)
	131	new = &((*new)->rb_right);
	132	else
	133	return FALSE;
	134	}
	135
	136	/* Add new node and rebalance tree. */
27af1da4	137	rb_link_node(&data->node, parent, new);
27af1da4	138	rb_insert_color(&data->node, root);
c742b531 RL	139
	140	return TRUE;
	141	}
	142
	143	Removing or replacing existing data in an rbtree
	144	------------------------------------------------
	145
ce0f95a5	146	To remove an existing node from a tree, call::
c742b531 RL	147
	148	void rb_erase(struct rb_node victim, struct rb_root tree);
	149
ce0f95a5	150	Example::
c742b531	151
27af1da4	152	struct mytype *data = mysearch(&mytree, "walrus");
c742b531 RL	153
c742b531 RL	154	if (data) {
27af1da4	155	rb_erase(&data->node, &mytree);
c742b531 RL	156	myfree(data);
	157	}
	158
ce0f95a5	159	To replace an existing node in a tree with a new one with the same key, call::
c742b531 RL	160
	161	void rb_replace_node(struct rb_node old, struct rb_node new,
	162	struct rb_root *tree);
	163
	164	Replacing a node this way does not re-sort the tree: If the new node doesn't
	165	have the same key as the old node, the rbtree will probably become corrupted.
	166
	167	Iterating through the elements stored in an rbtree (in sort order)
	168	------------------------------------------------------------------
	169
	170	Four functions are provided for iterating through an rbtree's contents in
	171	sorted order. These work on arbitrary trees, and should not need to be
ce0f95a5	172	modified or wrapped (except for locking purposes)::
c742b531 RL	173
	174	struct rb_node rb_first(struct rb_root tree);
	175	struct rb_node rb_last(struct rb_root tree);
	176	struct rb_node rb_next(struct rb_node node);
	177	struct rb_node rb_prev(struct rb_node node);
	178
	179	To start iterating, call rb_first() or rb_last() with a pointer to the root
	180	of the tree, which will return a pointer to the node structure contained in
	181	the first or last element in the tree. To continue, fetch the next or previous
	182	node by calling rb_next() or rb_prev() on the current node. This will return
	183	NULL when there are no more nodes left.
	184
	185	The iterator functions return a pointer to the embedded struct rb_node, from
	186	which the containing data structure may be accessed with the container_of()
	187	macro, and individual members may be accessed directly via
	188	rb_entry(node, type, member).
	189
ce0f95a5	190	Example::
c742b531 RL	191
	192	struct rb_node *node;
	193	for (node = rb_first(&mytree); node; node = rb_next(node))
19034233	194	printk("key=%s\n", rb_entry(node, struct mytype, node)->keystring);
c742b531	195
cd9e61ed DB	196	Cached rbtrees
	197	--------------
	198
	199	Computing the leftmost (smallest) node is quite a common task for binary
	200	search trees, such as for traversals or users relying on a the particular
	201	order for their own logic. To this end, users can use 'struct rb_root_cached'
	202	to optimize O(logN) rb_first() calls to a simple pointer fetch avoiding
	203	potentially expensive tree iterations. This is done at negligible runtime
	204	overhead for maintanence; albeit larger memory footprint.
	205
	206	Similar to the rb_root structure, cached rbtrees are initialized to be
	207	empty via:
	208
	209	struct rb_root_cached mytree = RB_ROOT_CACHED;
	210
	211	Cached rbtree is simply a regular rb_root with an extra pointer to cache the
	212	leftmost node. This allows rb_root_cached to exist wherever rb_root does,
	213	which permits augmented trees to be supported as well as only a few extra
	214	interfaces:
	215
	216	struct rb_node rb_first_cached(struct rb_root_cached tree);
	217	void rb_insert_color_cached(struct rb_node , struct rb_root_cached , bool);
	218	void rb_erase_cached(struct rb_node node, struct rb_root_cached );
	219
	220	Both insert and erase calls have their respective counterpart of augmented
	221	trees:
	222
	223	void rb_insert_augmented_cached(struct rb_node node, struct rb_root_cached ,
	224	bool, struct rb_augment_callbacks *);
	225	void rb_erase_augmented_cached(struct rb_node , struct rb_root_cached ,
	226	struct rb_augment_callbacks *);
	227
	228
17d9ddc7 PV	229	Support for Augmented rbtrees
	230	-----------------------------
	231
14b94af0 ML	232	Augmented rbtree is an rbtree with "some" additional data stored in
	233	each node, where the additional data for node N must be a function of
	234	the contents of all nodes in the subtree rooted at N. This data can
	235	be used to augment some new functionality to rbtree. Augmented rbtree
	236	is an optional feature built on top of basic rbtree infrastructure.
	237	An rbtree user who wants this feature will have to call the augmentation
	238	functions with the user provided augmentation callback when inserting
	239	and erasing nodes.
2f175074	240
9c079add	241	C files implementing augmented rbtree manipulation must include
121e0248	242	<linux/rbtree_augmented.h> instead of <linux/rbtree.h>. Note that
9c079add ML	243	linux/rbtree_augmented.h exposes some rbtree implementations details
	244	you are not expected to rely on; please stick to the documented APIs
	245	there and do not include <linux/rbtree_augmented.h> from header files
	246	either so as to minimize chances of your users accidentally relying on
	247	such implementation details.
	248
14b94af0 ML	249	On insertion, the user must update the augmented information on the path
	250	leading to the inserted node, then call rb_link_node() as usual and
	251	rb_augment_inserted() instead of the usual rb_insert_color() call.
	252	If rb_augment_inserted() rebalances the rbtree, it will callback into
	253	a user provided function to update the augmented information on the
	254	affected subtrees.
2f175074	255
14b94af0 ML	256	When erasing a node, the user must call rb_erase_augmented() instead of
	257	rb_erase(). rb_erase_augmented() calls back into user provided functions
	258	to updated the augmented information on affected subtrees.
17d9ddc7	259
14b94af0 ML	260	In both cases, the callbacks are provided through struct rb_augment_callbacks.
	261	3 callbacks must be defined:
	262
	263	- A propagation callback, which updates the augmented value for a given
	264	node and its ancestors, up to a given stop point (or NULL to update
	265	all the way to the root).
	266
	267	- A copy callback, which copies the augmented value for a given subtree
	268	to a newly assigned subtree root.
	269
	270	- A tree rotation callback, which copies the augmented value for a given
	271	subtree to a newly assigned subtree root AND recomputes the augmented
	272	information for the former subtree root.
	273
9c079add ML	274	The compiled code for rb_erase_augmented() may inline the propagation and
	275	copy callbacks, which results in a large function, so each augmented rbtree
	276	user should have a single rb_erase_augmented() call site in order to limit
	277	compiled code size.
	278
14b94af0	279
ce0f95a5 MCC	280	Sample usage
ce0f95a5 MCC	281	^^^^^^^^^^^^
17d9ddc7 PV	282
	283	Interval tree is an example of augmented rb tree. Reference -
	284	"Introduction to Algorithms" by Cormen, Leiserson, Rivest and Stein.
	285	More details about interval trees:
	286
	287	Classical rbtree has a single key and it cannot be directly used to store
	288	interval ranges like [lo:hi] and do a quick lookup for any overlap with a new
	289	lo:hi or to find whether there is an exact match for a new lo:hi.
	290
	291	However, rbtree can be augmented to store such interval ranges in a structured
	292	way making it possible to do efficient lookup and exact match.
	293
	294	This "extra information" stored in each node is the maximum hi
c98be0c9	295	(max_hi) value among all the nodes that are its descendants. This
17d9ddc7 PV	296	information can be maintained at each node just be looking at the node
	297	and its immediate children. And this will be used in O(log n) lookup
	298	for lowest match (lowest start address among all possible matches)
ce0f95a5	299	with something like::
17d9ddc7	300
ce0f95a5 MCC	301	struct interval_tree_node *
	302	interval_tree_first_match(struct rb_root *root,
	303	unsigned long start, unsigned long last)
	304	{
14b94af0 ML	305	struct interval_tree_node *node;
	306
	307	if (!root->rb_node)
	308	return NULL;
	309	node = rb_entry(root->rb_node, struct interval_tree_node, rb);
	310
	311	while (true) {
	312	if (node->rb.rb_left) {
	313	struct interval_tree_node *left =
	314	rb_entry(node->rb.rb_left,
	315	struct interval_tree_node, rb);
	316	if (left->__subtree_last >= start) {
	317	/*
	318	* Some nodes in left subtree satisfy Cond2.
	319	* Iterate to find the leftmost such node N.
	320	* If it also satisfies Cond1, that's the match
	321	* we are looking for. Otherwise, there is no
	322	* matching interval as nodes to the right of N
	323	* can't satisfy Cond1 either.
	324	*/
	325	node = left;
	326	continue;
	327	}
17d9ddc7	328	}
14b94af0 ML	329	if (node->start <= last) { /* Cond1 */
	330	if (node->last >= start) /* Cond2 */
	331	return node; /* node is leftmost match */
	332	if (node->rb.rb_right) {
	333	node = rb_entry(node->rb.rb_right,
	334	struct interval_tree_node, rb);
	335	if (node->__subtree_last >= start)
	336	continue;
	337	}
	338	}
	339	return NULL; /* No match */
	340	}
ce0f95a5	341	}
14b94af0	342
ce0f95a5	343	Insertion/removal are defined using the following augmented callbacks::
14b94af0	344
ce0f95a5 MCC	345	static inline unsigned long
	346	compute_subtree_last(struct interval_tree_node *node)
	347	{
14b94af0 ML	348	unsigned long max = node->last, subtree_last;
	349	if (node->rb.rb_left) {
	350	subtree_last = rb_entry(node->rb.rb_left,
	351	struct interval_tree_node, rb)->__subtree_last;
	352	if (max < subtree_last)
	353	max = subtree_last;
	354	}
	355	if (node->rb.rb_right) {
	356	subtree_last = rb_entry(node->rb.rb_right,
	357	struct interval_tree_node, rb)->__subtree_last;
	358	if (max < subtree_last)
	359	max = subtree_last;
	360	}
	361	return max;
ce0f95a5	362	}
14b94af0	363
ce0f95a5 MCC	364	static void augment_propagate(struct rb_node rb, struct rb_node stop)
ce0f95a5 MCC	365	{
14b94af0 ML	366	while (rb != stop) {
	367	struct interval_tree_node *node =
	368	rb_entry(rb, struct interval_tree_node, rb);
	369	unsigned long subtree_last = compute_subtree_last(node);
	370	if (node->__subtree_last == subtree_last)
	371	break;
	372	node->__subtree_last = subtree_last;
	373	rb = rb_parent(&node->rb);
	374	}
ce0f95a5	375	}
14b94af0	376
ce0f95a5 MCC	377	static void augment_copy(struct rb_node rb_old, struct rb_node rb_new)
ce0f95a5 MCC	378	{
14b94af0 ML	379	struct interval_tree_node *old =
	380	rb_entry(rb_old, struct interval_tree_node, rb);
	381	struct interval_tree_node *new =
	382	rb_entry(rb_new, struct interval_tree_node, rb);
	383
	384	new->__subtree_last = old->__subtree_last;
ce0f95a5	385	}
14b94af0	386
ce0f95a5 MCC	387	static void augment_rotate(struct rb_node rb_old, struct rb_node rb_new)
ce0f95a5 MCC	388	{
14b94af0 ML	389	struct interval_tree_node *old =
	390	rb_entry(rb_old, struct interval_tree_node, rb);
	391	struct interval_tree_node *new =
	392	rb_entry(rb_new, struct interval_tree_node, rb);
	393
	394	new->__subtree_last = old->__subtree_last;
	395	old->__subtree_last = compute_subtree_last(old);
ce0f95a5	396	}
14b94af0	397
ce0f95a5	398	static const struct rb_augment_callbacks augment_callbacks = {
14b94af0	399	augment_propagate, augment_copy, augment_rotate
ce0f95a5	400	};
14b94af0	401
ce0f95a5 MCC	402	void interval_tree_insert(struct interval_tree_node *node,
	403	struct rb_root *root)
	404	{
14b94af0 ML	405	struct rb_node *link = &root->rb_node, rb_parent = NULL;
	406	unsigned long start = node->start, last = node->last;
	407	struct interval_tree_node *parent;
	408
	409	while (*link) {
	410	rb_parent = *link;
	411	parent = rb_entry(rb_parent, struct interval_tree_node, rb);
	412	if (parent->__subtree_last < last)
	413	parent->__subtree_last = last;
	414	if (start < parent->start)
	415	link = &parent->rb.rb_left;
	416	else
	417	link = &parent->rb.rb_right;
17d9ddc7	418	}
14b94af0 ML	419
	420	node->__subtree_last = last;
	421	rb_link_node(&node->rb, rb_parent, link);
	422	rb_insert_augmented(&node->rb, root, &augment_callbacks);
ce0f95a5	423	}
17d9ddc7	424
ce0f95a5 MCC	425	void interval_tree_remove(struct interval_tree_node *node,
	426	struct rb_root *root)
	427	{
14b94af0	428	rb_erase_augmented(&node->rb, root, &augment_callbacks);
ce0f95a5	429	}