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/*
* Elastic Binary Trees - macros and structures for operations on 64bit nodes.
* Version 6.0.6
* (C) 2002-2011 - Willy Tarreau <w@1wt.eu>
*
* This library is free software; you can redistribute it and/or
* modify it under the terms of the GNU Lesser General Public
* License as published by the Free Software Foundation, version 2.1
* exclusively.
*
* This library is distributed in the hope that it will be useful,
* but WITHOUT ANY WARRANTY; without even the implied warranty of
* MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU
* Lesser General Public License for more details.
*
* You should have received a copy of the GNU Lesser General Public
* License along with this library; if not, write to the Free Software
* Foundation, Inc., 51 Franklin Street, Fifth Floor, Boston, MA 02110-1301 USA
*/
#ifndef _EB64TREE_H
#define _EB64TREE_H
#include "ebtree.h"
/* Return the structure of type <type> whose member <member> points to <ptr> */
#define eb64_entry(ptr, type, member) container_of(ptr, type, member)
/*
* Exported functions and macros.
* Many of them are always inlined because they are extremely small, and
* are generally called at most once or twice in a program.
*/
/* Return leftmost node in the tree, or NULL if none */
static inline struct eb64_node *eb64_first(struct eb_root *root)
{
return eb64_entry(eb_first(root), struct eb64_node, node);
}
/* Return rightmost node in the tree, or NULL if none */
static inline struct eb64_node *eb64_last(struct eb_root *root)
{
return eb64_entry(eb_last(root), struct eb64_node, node);
}
/* Return next node in the tree, or NULL if none */
static inline struct eb64_node *eb64_next(struct eb64_node *eb64)
{
return eb64_entry(eb_next(&eb64->node), struct eb64_node, node);
}
/* Return previous node in the tree, or NULL if none */
static inline struct eb64_node *eb64_prev(struct eb64_node *eb64)
{
return eb64_entry(eb_prev(&eb64->node), struct eb64_node, node);
}
/* Return next leaf node within a duplicate sub-tree, or NULL if none. */
static inline struct eb64_node *eb64_next_dup(struct eb64_node *eb64)
{
return eb64_entry(eb_next_dup(&eb64->node), struct eb64_node, node);
}
/* Return previous leaf node within a duplicate sub-tree, or NULL if none. */
static inline struct eb64_node *eb64_prev_dup(struct eb64_node *eb64)
{
return eb64_entry(eb_prev_dup(&eb64->node), struct eb64_node, node);
}
/* Return next node in the tree, skipping duplicates, or NULL if none */
static inline struct eb64_node *eb64_next_unique(struct eb64_node *eb64)
{
return eb64_entry(eb_next_unique(&eb64->node), struct eb64_node, node);
}
/* Return previous node in the tree, skipping duplicates, or NULL if none */
static inline struct eb64_node *eb64_prev_unique(struct eb64_node *eb64)
{
return eb64_entry(eb_prev_unique(&eb64->node), struct eb64_node, node);
}
/* Delete node from the tree if it was linked in. Mark the node unused. Note
* that this function relies on a non-inlined generic function: eb_delete.
*/
static inline void eb64_delete(struct eb64_node *eb64)
{
eb_delete(&eb64->node);
}
/*
* The following functions are not inlined by default. They are declared
* in eb64tree.c, which simply relies on their inline version.
*/
struct eb64_node *eb64_lookup(struct eb_root *root, u64 x);
struct eb64_node *eb64i_lookup(struct eb_root *root, s64 x);
struct eb64_node *eb64_lookup_le(struct eb_root *root, u64 x);
struct eb64_node *eb64_lookup_ge(struct eb_root *root, u64 x);
struct eb64_node *eb64_insert(struct eb_root *root, struct eb64_node *new);
struct eb64_node *eb64i_insert(struct eb_root *root, struct eb64_node *new);
/*
* The following functions are less likely to be used directly, because their
* code is larger. The non-inlined version is preferred.
*/
/* Delete node from the tree if it was linked in. Mark the node unused. */
static forceinline void __eb64_delete(struct eb64_node *eb64)
{
__eb_delete(&eb64->node);
}
/*
* Find the first occurrence of a key in the tree <root>. If none can be
* found, return NULL.
*/
static forceinline struct eb64_node *__eb64_lookup(struct eb_root *root, u64 x)
{
struct eb64_node *node;
eb_troot_t *troot;
u64 y;
troot = root->b[EB_LEFT];
if (unlikely(troot == NULL))
return NULL;
while (1) {
if ((eb_gettag(troot) == EB_LEAF)) {
node = container_of(eb_untag(troot, EB_LEAF),
struct eb64_node, node.branches);
if (node->key == x)
return node;
else
return NULL;
}
node = container_of(eb_untag(troot, EB_NODE),
struct eb64_node, node.branches);
y = node->key ^ x;
if (!y) {
/* Either we found the node which holds the key, or
* we have a dup tree. In the later case, we have to
* walk it down left to get the first entry.
*/
if (node->node.bit < 0) {
troot = node->node.branches.b[EB_LEFT];
while (eb_gettag(troot) != EB_LEAF)
troot = (eb_untag(troot, EB_NODE))->b[EB_LEFT];
node = container_of(eb_untag(troot, EB_LEAF),
struct eb64_node, node.branches);
}
return node;
}
if ((y >> node->node.bit) >= EB_NODE_BRANCHES)
return NULL; /* no more common bits */
troot = node->node.branches.b[(x >> node->node.bit) & EB_NODE_BRANCH_MASK];
}
}
/*
* Find the first occurrence of a signed key in the tree <root>. If none can
* be found, return NULL.
*/
static forceinline struct eb64_node *__eb64i_lookup(struct eb_root *root, s64 x)
{
struct eb64_node *node;
eb_troot_t *troot;
u64 key = x ^ (1ULL << 63);
u64 y;
troot = root->b[EB_LEFT];
if (unlikely(troot == NULL))
return NULL;
while (1) {
if ((eb_gettag(troot) == EB_LEAF)) {
node = container_of(eb_untag(troot, EB_LEAF),
struct eb64_node, node.branches);
if (node->key == (u64)x)
return node;
else
return NULL;
}
node = container_of(eb_untag(troot, EB_NODE),
struct eb64_node, node.branches);
y = node->key ^ x;
if (!y) {
/* Either we found the node which holds the key, or
* we have a dup tree. In the later case, we have to
* walk it down left to get the first entry.
*/
if (node->node.bit < 0) {
troot = node->node.branches.b[EB_LEFT];
while (eb_gettag(troot) != EB_LEAF)
troot = (eb_untag(troot, EB_NODE))->b[EB_LEFT];
node = container_of(eb_untag(troot, EB_LEAF),
struct eb64_node, node.branches);
}
return node;
}
if ((y >> node->node.bit) >= EB_NODE_BRANCHES)
return NULL; /* no more common bits */
troot = node->node.branches.b[(key >> node->node.bit) & EB_NODE_BRANCH_MASK];
}
}
/* Insert eb64_node <new> into subtree starting at node root <root>.
* Only new->key needs be set with the key. The eb64_node is returned.
* If root->b[EB_RGHT]==1, the tree may only contain unique keys.
*/
static forceinline struct eb64_node *
__eb64_insert(struct eb_root *root, struct eb64_node *new) {
struct eb64_node *old;
unsigned int side;
eb_troot_t *troot;
u64 newkey; /* caching the key saves approximately one cycle */
eb_troot_t *root_right;
int old_node_bit;
side = EB_LEFT;
troot = root->b[EB_LEFT];
root_right = root->b[EB_RGHT];
if (unlikely(troot == NULL)) {
/* Tree is empty, insert the leaf part below the left branch */
root->b[EB_LEFT] = eb_dotag(&new->node.branches, EB_LEAF);
new->node.leaf_p = eb_dotag(root, EB_LEFT);
new->node.node_p = NULL; /* node part unused */
return new;
}
/* The tree descent is fairly easy :
* - first, check if we have reached a leaf node
* - second, check if we have gone too far
* - third, reiterate
* Everywhere, we use <new> for the node node we are inserting, <root>
* for the node we attach it to, and <old> for the node we are
* displacing below <new>. <troot> will always point to the future node
* (tagged with its type). <side> carries the side the node <new> is
* attached to below its parent, which is also where previous node
* was attached. <newkey> carries the key being inserted.
*/
newkey = new->key;
while (1) {
if (unlikely(eb_gettag(troot) == EB_LEAF)) {
eb_troot_t *new_left, *new_rght;
eb_troot_t *new_leaf, *old_leaf;
old = container_of(eb_untag(troot, EB_LEAF),
struct eb64_node, node.branches);
new_left = eb_dotag(&new->node.branches, EB_LEFT);
new_rght = eb_dotag(&new->node.branches, EB_RGHT);
new_leaf = eb_dotag(&new->node.branches, EB_LEAF);
old_leaf = eb_dotag(&old->node.branches, EB_LEAF);
new->node.node_p = old->node.leaf_p;
/* Right here, we have 3 possibilities :
- the tree does not contain the key, and we have
new->key < old->key. We insert new above old, on
the left ;
- the tree does not contain the key, and we have
new->key > old->key. We insert new above old, on
the right ;
- the tree does contain the key, which implies it
is alone. We add the new key next to it as a
first duplicate.
The last two cases can easily be partially merged.
*/
if (new->key < old->key) {
new->node.leaf_p = new_left;
old->node.leaf_p = new_rght;
new->node.branches.b[EB_LEFT] = new_leaf;
new->node.branches.b[EB_RGHT] = old_leaf;
} else {
/* we may refuse to duplicate this key if the tree is
* tagged as containing only unique keys.
*/
if ((new->key == old->key) && eb_gettag(root_right))
return old;
/* new->key >= old->key, new goes the right */
old->node.leaf_p = new_left;
new->node.leaf_p = new_rght;
new->node.branches.b[EB_LEFT] = old_leaf;
new->node.branches.b[EB_RGHT] = new_leaf;
if (new->key == old->key) {
new->node.bit = -1;
root->b[side] = eb_dotag(&new->node.branches, EB_NODE);
return new;
}
}
break;
}
/* OK we're walking down this link */
old = container_of(eb_untag(troot, EB_NODE),
struct eb64_node, node.branches);
old_node_bit = old->node.bit;
/* Stop going down when we don't have common bits anymore. We
* also stop in front of a duplicates tree because it means we
* have to insert above.
*/
if ((old_node_bit < 0) || /* we're above a duplicate tree, stop here */
(((new->key ^ old->key) >> old_node_bit) >= EB_NODE_BRANCHES)) {
/* The tree did not contain the key, so we insert <new> before the node
* <old>, and set ->bit to designate the lowest bit position in <new>
* which applies to ->branches.b[].
*/
eb_troot_t *new_left, *new_rght;
eb_troot_t *new_leaf, *old_node;
new_left = eb_dotag(&new->node.branches, EB_LEFT);
new_rght = eb_dotag(&new->node.branches, EB_RGHT);
new_leaf = eb_dotag(&new->node.branches, EB_LEAF);
old_node = eb_dotag(&old->node.branches, EB_NODE);
new->node.node_p = old->node.node_p;
if (new->key < old->key) {
new->node.leaf_p = new_left;
old->node.node_p = new_rght;
new->node.branches.b[EB_LEFT] = new_leaf;
new->node.branches.b[EB_RGHT] = old_node;
}
else if (new->key > old->key) {
old->node.node_p = new_left;
new->node.leaf_p = new_rght;
new->node.branches.b[EB_LEFT] = old_node;
new->node.branches.b[EB_RGHT] = new_leaf;
}
else {
struct eb_node *ret;
ret = eb_insert_dup(&old->node, &new->node);
return container_of(ret, struct eb64_node, node);
}
break;
}
/* walk down */
root = &old->node.branches;
if (sizeof(long) >= 8) {
side = newkey >> old_node_bit;
} else {
/* note: provides the best code on low-register count archs
* such as i386.
*/
side = newkey;
side >>= old_node_bit;
if (old_node_bit >= 32) {
side = newkey >> 32;
side >>= old_node_bit & 0x1F;
}
}
side &= EB_NODE_BRANCH_MASK;
troot = root->b[side];
}
/* Ok, now we are inserting <new> between <root> and <old>. <old>'s
* parent is already set to <new>, and the <root>'s branch is still in
* <side>. Update the root's leaf till we have it. Note that we can also
* find the side by checking the side of new->node.node_p.
*/
/* We need the common higher bits between new->key and old->key.
* What differences are there between new->key and the node here ?
* NOTE that bit(new) is always < bit(root) because highest
* bit of new->key and old->key are identical here (otherwise they
* would sit on different branches).
*/
// note that if EB_NODE_BITS > 1, we should check that it's still >= 0
new->node.bit = fls64(new->key ^ old->key) - EB_NODE_BITS;
root->b[side] = eb_dotag(&new->node.branches, EB_NODE);
return new;
}
/* Insert eb64_node <new> into subtree starting at node root <root>, using
* signed keys. Only new->key needs be set with the key. The eb64_node
* is returned. If root->b[EB_RGHT]==1, the tree may only contain unique keys.
*/
static forceinline struct eb64_node *
__eb64i_insert(struct eb_root *root, struct eb64_node *new) {
struct eb64_node *old;
unsigned int side;
eb_troot_t *troot;
u64 newkey; /* caching the key saves approximately one cycle */
eb_troot_t *root_right;
int old_node_bit;
side = EB_LEFT;
troot = root->b[EB_LEFT];
root_right = root->b[EB_RGHT];
if (unlikely(troot == NULL)) {
/* Tree is empty, insert the leaf part below the left branch */
root->b[EB_LEFT] = eb_dotag(&new->node.branches, EB_LEAF);
new->node.leaf_p = eb_dotag(root, EB_LEFT);
new->node.node_p = NULL; /* node part unused */
return new;
}
/* The tree descent is fairly easy :
* - first, check if we have reached a leaf node
* - second, check if we have gone too far
* - third, reiterate
* Everywhere, we use <new> for the node node we are inserting, <root>
* for the node we attach it to, and <old> for the node we are
* displacing below <new>. <troot> will always point to the future node
* (tagged with its type). <side> carries the side the node <new> is
* attached to below its parent, which is also where previous node
* was attached. <newkey> carries a high bit shift of the key being
* inserted in order to have negative keys stored before positive
* ones.
*/
newkey = new->key ^ (1ULL << 63);
while (1) {
if (unlikely(eb_gettag(troot) == EB_LEAF)) {
eb_troot_t *new_left, *new_rght;
eb_troot_t *new_leaf, *old_leaf;
old = container_of(eb_untag(troot, EB_LEAF),
struct eb64_node, node.branches);
new_left = eb_dotag(&new->node.branches, EB_LEFT);
new_rght = eb_dotag(&new->node.branches, EB_RGHT);
new_leaf = eb_dotag(&new->node.branches, EB_LEAF);
old_leaf = eb_dotag(&old->node.branches, EB_LEAF);
new->node.node_p = old->node.leaf_p;
/* Right here, we have 3 possibilities :
- the tree does not contain the key, and we have
new->key < old->key. We insert new above old, on
the left ;
- the tree does not contain the key, and we have
new->key > old->key. We insert new above old, on
the right ;
- the tree does contain the key, which implies it
is alone. We add the new key next to it as a
first duplicate.
The last two cases can easily be partially merged.
*/
if ((s64)new->key < (s64)old->key) {
new->node.leaf_p = new_left;
old->node.leaf_p = new_rght;
new->node.branches.b[EB_LEFT] = new_leaf;
new->node.branches.b[EB_RGHT] = old_leaf;
} else {
/* we may refuse to duplicate this key if the tree is
* tagged as containing only unique keys.
*/
if ((new->key == old->key) && eb_gettag(root_right))
return old;
/* new->key >= old->key, new goes the right */
old->node.leaf_p = new_left;
new->node.leaf_p = new_rght;
new->node.branches.b[EB_LEFT] = old_leaf;
new->node.branches.b[EB_RGHT] = new_leaf;
if (new->key == old->key) {
new->node.bit = -1;
root->b[side] = eb_dotag(&new->node.branches, EB_NODE);
return new;
}
}
break;
}
/* OK we're walking down this link */
old = container_of(eb_untag(troot, EB_NODE),
struct eb64_node, node.branches);
old_node_bit = old->node.bit;
/* Stop going down when we don't have common bits anymore. We
* also stop in front of a duplicates tree because it means we
* have to insert above.
*/
if ((old_node_bit < 0) || /* we're above a duplicate tree, stop here */
(((new->key ^ old->key) >> old_node_bit) >= EB_NODE_BRANCHES)) {
/* The tree did not contain the key, so we insert <new> before the node
* <old>, and set ->bit to designate the lowest bit position in <new>
* which applies to ->branches.b[].
*/
eb_troot_t *new_left, *new_rght;
eb_troot_t *new_leaf, *old_node;
new_left = eb_dotag(&new->node.branches, EB_LEFT);
new_rght = eb_dotag(&new->node.branches, EB_RGHT);
new_leaf = eb_dotag(&new->node.branches, EB_LEAF);
old_node = eb_dotag(&old->node.branches, EB_NODE);
new->node.node_p = old->node.node_p;
if ((s64)new->key < (s64)old->key) {
new->node.leaf_p = new_left;
old->node.node_p = new_rght;
new->node.branches.b[EB_LEFT] = new_leaf;
new->node.branches.b[EB_RGHT] = old_node;
}
else if ((s64)new->key > (s64)old->key) {
old->node.node_p = new_left;
new->node.leaf_p = new_rght;
new->node.branches.b[EB_LEFT] = old_node;
new->node.branches.b[EB_RGHT] = new_leaf;
}
else {
struct eb_node *ret;
ret = eb_insert_dup(&old->node, &new->node);
return container_of(ret, struct eb64_node, node);
}
break;
}
/* walk down */
root = &old->node.branches;
if (sizeof(long) >= 8) {
side = newkey >> old_node_bit;
} else {
/* note: provides the best code on low-register count archs
* such as i386.
*/
side = newkey;
side >>= old_node_bit;
if (old_node_bit >= 32) {
side = newkey >> 32;
side >>= old_node_bit & 0x1F;
}
}
side &= EB_NODE_BRANCH_MASK;
troot = root->b[side];
}
/* Ok, now we are inserting <new> between <root> and <old>. <old>'s
* parent is already set to <new>, and the <root>'s branch is still in
* <side>. Update the root's leaf till we have it. Note that we can also
* find the side by checking the side of new->node.node_p.
*/
/* We need the common higher bits between new->key and old->key.
* What differences are there between new->key and the node here ?
* NOTE that bit(new) is always < bit(root) because highest
* bit of new->key and old->key are identical here (otherwise they
* would sit on different branches).
*/
// note that if EB_NODE_BITS > 1, we should check that it's still >= 0
new->node.bit = fls64(new->key ^ old->key) - EB_NODE_BITS;
root->b[side] = eb_dotag(&new->node.branches, EB_NODE);
return new;
}
#endif /* _EB64_TREE_H */