lib/os/rb.c - third_party/github/zephyrproject-rtos/zephyr - Git at Google

 /*
  * Copyright (c) 2018 Intel Corporation
  *
  * SPDX-License-Identifier: Apache-2.0
  */

 /* These assertions are very useful when debugging the tree code
  * itself, but produce significant performance degradation as they are
  * checked many times per operation.  Leave them off unless you're
  * working on the rbtree code itself
  */
 #define CHECK(n) /**/
 /* #define CHECK(n) __ASSERT_NO_MSG(n) */

 #include <zephyr/kernel.h>
 #include <zephyr/sys/rb.h>
 #include <stdbool.h>

 enum rb_color { RED = 0U, BLACK = 1U };

 static struct rbnode *get_child(struct rbnode *n, uint8_t side)
 {
 	CHECK(n);
 	if (side != 0U) {
 		return n->children[1];
 	}

 	uintptr_t l = (uintptr_t) n->children[0];

 	l &= ~1UL;
 	return (struct rbnode *) l;
 }

 static void set_child(struct rbnode *n, uint8_t side, void *val)
 {
 	CHECK(n);
 	if (side != 0U) {
 		n->children[1] = val;
 	} else {
 		uintptr_t old = (uintptr_t) n->children[0];
 		uintptr_t new = (uintptr_t) val;

 		n->children[0] = (void *) (new | (old & 1UL));
 	}
 }

 static enum rb_color get_color(struct rbnode *n)
 {
 	CHECK(n);
 	return ((uintptr_t)n->children[0]) & 1UL;
 }

 static bool is_black(struct rbnode *n)
 {
 	return get_color(n) == BLACK;
 }

 static bool is_red(struct rbnode *n)
 {
 	return get_color(n) == RED;
 }

 static void set_color(struct rbnode *n, enum rb_color color)
 {
 	CHECK(n);

 	uintptr_t *p = (void *) &n->children[0];

 	*p = (*p & ~1UL) | (uint8_t)color;
 }

 /* Searches the tree down to a node that is either identical with the
  * "node" argument or has an empty/leaf child pointer where "node"
  * should be, leaving all nodes found in the resulting stack.  Note
  * that tree must not be empty and that stack should be allocated to
  * contain at least tree->max_depth entries!  Returns the number of
  * entries pushed onto the stack.
  */
 static int find_and_stack(struct rbtree *tree, struct rbnode *node,
 			  struct rbnode **stack)
 {
 	int sz = 0;

 	stack[sz++] = tree->root;

 	while (stack[sz - 1] != node) {
 		uint8_t side = tree->lessthan_fn(node, stack[sz - 1]) ? 0U : 1U;
 		struct rbnode *ch = get_child(stack[sz - 1], side);

 		if (ch != NULL) {
 			stack[sz++] = ch;
 		} else {
 			break;
 		}
 	}

 	return sz;
 }

 struct rbnode *z_rb_get_minmax(struct rbtree *tree, uint8_t side)
 {
 	struct rbnode *n;

 	for (n = tree->root; (n != NULL) && (get_child(n, side) != NULL);
 			n = get_child(n, side)) {
 		;
 	}
 	return n;
 }

 static uint8_t get_side(struct rbnode *parent, struct rbnode *child)
 {
 	CHECK(get_child(parent, 0U) == child || get_child(parent, 1U) == child);

 	return (get_child(parent, 1U) == child) ? 1U : 0U;
 }

 /* Swaps the position of the two nodes at the top of the provided
  * stack, modifying the stack accordingly. Does not change the color
  * of either node.  That is, it effects the following transition (or
  * its mirror if N is on the other side of P, of course):
  *
  *    P          N
  *  N  c  -->  a   P
  * a b            b c
  *
  */
 static void rotate(struct rbnode **stack, int stacksz)
 {
 	CHECK(stacksz >= 2);

 	struct rbnode *parent = stack[stacksz - 2];
 	struct rbnode *child = stack[stacksz - 1];
 	uint8_t side = get_side(parent, child);
 	struct rbnode *a = get_child(child, side);
 	struct rbnode *b = get_child(child, (side == 0U) ? 1U : 0U);

 	if (stacksz >= 3) {
 		struct rbnode *grandparent = stack[stacksz - 3];

 		set_child(grandparent, get_side(grandparent, parent), child);
 	}

 	set_child(child, side, a);
 	set_child(child, (side == 0U) ? 1U : 0U, parent);
 	set_child(parent, side, b);
 	stack[stacksz - 2] = child;
 	stack[stacksz - 1] = parent;
 }

 /* The node at the top of the provided stack is red, and its parent is
  * too.  Iteratively fix the tree so it becomes a valid red black tree
  * again
  */
 static void fix_extra_red(struct rbnode **stack, int stacksz)
 {
 	while (stacksz > 1) {
 		struct rbnode *node = stack[stacksz - 1];
 		struct rbnode *parent = stack[stacksz - 2];

 		/* Correct child colors are a precondition of the loop */
 		CHECK((get_child(node, 0U) == NULL) ||
 		      is_black(get_child(node, 0U)));
 		CHECK((get_child(node, 1U) == NULL) ||
 		      is_black(get_child(node, 1U)));

 		if (is_black(parent)) {
 			return;
 		}

 		/* We are guaranteed to have a grandparent if our
 		 * parent is red, as red nodes cannot be the root
 		 */
 		CHECK(stacksz >= 2);

 		struct rbnode *grandparent = stack[stacksz - 3];
 		uint8_t side = get_side(grandparent, parent);
 		struct rbnode *aunt = get_child(grandparent,
 						(side == 0U) ? 1U : 0U);

 		if ((aunt != NULL) && is_red(aunt)) {
 			set_color(grandparent, RED);
 			set_color(parent, BLACK);
 			set_color(aunt, BLACK);

 			/* We colored the grandparent red, which might
 			 * have a red parent, so continue iterating
 			 * from there.
 			 */
 			stacksz -= 2;
 			continue;
 		}

 		/* We can rotate locally to fix the whole tree.  First
 		 * make sure that node is on the same side of parent
 		 * as parent is of grandparent.
 		 */
 		uint8_t parent_side = get_side(parent, node);

 		if (parent_side != side) {
 			rotate(stack, stacksz);
 		}

 		/* Rotate the grandparent with parent, swapping colors */
 		rotate(stack, stacksz - 1);
 		set_color(stack[stacksz - 3], BLACK);
 		set_color(stack[stacksz - 2], RED);
 		return;
 	}

 	/* If we exit the loop, it's because our node is now the root,
 	 * which must be black.
 	 */
 	set_color(stack[0], BLACK);
 }

 void rb_insert(struct rbtree *tree, struct rbnode *node)
 {
 	set_child(node, 0U, NULL);
 	set_child(node, 1U, NULL);

 	if (tree->root == NULL) {
 		tree->root = node;
 		tree->max_depth = 1;
 		set_color(node, BLACK);
 		return;
 	}

 #ifdef CONFIG_MISRA_SANE
 	struct rbnode **stack = &tree->iter_stack[0];
 #else
 	struct rbnode *stack[tree->max_depth + 1];
 #endif

 	int stacksz = find_and_stack(tree, node, stack);

 	struct rbnode *parent = stack[stacksz - 1];

 	uint8_t side = tree->lessthan_fn(node, parent) ? 0U : 1U;

 	set_child(parent, side, node);
 	set_color(node, RED);

 	stack[stacksz++] = node;
 	fix_extra_red(stack, stacksz);

 	if (stacksz > tree->max_depth) {
 		tree->max_depth = stacksz;
 	}

 	/* We may have rotated up into the root! */
 	tree->root = stack[0];
 	CHECK(is_black(tree->root));
 }

 /* Called for a node N (at the top of the stack) which after a
  * deletion operation is "missing a black" in its subtree.  By
  * construction N must be black (because if it was red it would be
  * trivially fixed by recoloring and we wouldn't be here).  Fixes up
  * the tree to preserve red/black rules.  The "null_node" pointer is
  * for situations where we are removing a childless black node.  The
  * tree munging needs a real node for simplicity, so we use it and
  * then clean it up (replace it with a simple NULL child in the
  * parent) when finished.
  */
 static void fix_missing_black(struct rbnode **stack, int stacksz,
 			      struct rbnode *null_node)
 {
 	/* Loop upward until we reach the root */
 	while (stacksz > 1) {
 		struct rbnode *c0, *c1, *inner, *outer;
 		struct rbnode *n = stack[stacksz - 1];
 		struct rbnode *parent = stack[stacksz - 2];
 		uint8_t n_side = get_side(parent, n);
 		struct rbnode *sib = get_child(parent,
 					       (n_side == 0U) ? 1U : 0U);

 		CHECK(is_black(n));

 		/* Guarantee the sibling is black, rotating N down a
 		 * level if needed (after rotate() our parent is the
 		 * child of our previous-sibling, so N is lower in the
 		 * tree)
 		 */
 		if (!is_black(sib)) {
 			stack[stacksz - 1] = sib;
 			rotate(stack, stacksz);
 			set_color(parent, RED);
 			set_color(sib, BLACK);
 			stack[stacksz++] = n;

 			parent = stack[stacksz - 2];
 			sib = get_child(parent, (n_side == 0U) ? 1U : 0U);
 		}

 		CHECK(sib);

 		/* Cases where the sibling has only black children
 		 * have simple resolutions
 		 */
 		c0 = get_child(sib, 0U);
 		c1 = get_child(sib, 1U);
 		if (((c0 == NULL) || is_black(c0)) && ((c1 == NULL) ||
 					is_black(c1))) {
 			if (n == null_node) {
 				set_child(parent, n_side, NULL);
 			}

 			set_color(sib, RED);
 			if (is_black(parent)) {
 				/* Balance the sibling's subtree by
 				 * coloring it red, then our parent
 				 * has a missing black so iterate
 				 * upward
 				 */
 				stacksz--;
 				continue;
 			} else {
 				/* Recoloring makes the whole tree OK */
 				set_color(parent, BLACK);
 				return;
 			}
 		}

 		CHECK((c0 && is_red(c0)) || (c1 && is_red(c1)));

 		/* We know sibling has at least one red child.  Fix it
 		 * so that the far/outer position (i.e. on the
 		 * opposite side from N) is definitely red.
 		 */
 		outer = get_child(sib, (n_side == 0U) ? 1U : 0U);
 		if (!((outer != NULL) && is_red(outer))) {
 			inner = get_child(sib, n_side);

 			stack[stacksz - 1] = sib;
 			stack[stacksz++] = inner;
 			rotate(stack, stacksz);
 			set_color(sib, RED);
 			set_color(inner, BLACK);

 			/* Restore stack state to have N on the top
 			 * and make sib reflect the new sibling
 			 */
 			sib = stack[stacksz - 2];
 			outer = get_child(sib, (n_side == 0U) ? 1U : 0U);
 			stack[stacksz - 2] = n;
 			stacksz--;
 		}

 		/* Finally, the sibling must have a red child in the
 		 * far/outer slot.  We can rotate sib with our parent
 		 * and recolor to produce a valid tree.
 		 */
 		CHECK(is_red(outer));
 		set_color(sib, get_color(parent));
 		set_color(parent, BLACK);
 		set_color(outer, BLACK);
 		stack[stacksz - 1] = sib;
 		rotate(stack, stacksz);
 		if (n == null_node) {
 			set_child(parent, n_side, NULL);
 		}
 		return;
 	}
 }

 void rb_remove(struct rbtree *tree, struct rbnode *node)
 {
 	struct rbnode *tmp;
 #ifdef CONFIG_MISRA_SANE
 	struct rbnode **stack = &tree->iter_stack[0];
 #else
 	struct rbnode *stack[tree->max_depth + 1];
 #endif

 	int stacksz = find_and_stack(tree, node, stack);

 	if (node != stack[stacksz - 1]) {
 		return;
 	}

 	/* We can only remove a node with zero or one child, if we
 	 * have two then pick the "biggest" child of side 0 (smallest
 	 * of 1 would work too) and swap our spot in the tree with
 	 * that one
 	 */
 	if ((get_child(node, 0U) != NULL) && (get_child(node, 1U) != NULL)) {
 		int stacksz0 = stacksz;
 		struct rbnode *hiparent, *loparent;
 		struct rbnode *node2 = get_child(node, 0U);

 		hiparent = (stacksz > 1) ? stack[stacksz - 2] : NULL;
 		stack[stacksz++] = node2;
 		while (get_child(node2, 1U) != NULL) {
 			node2 = get_child(node2, 1U);
 			stack[stacksz++] = node2;
 		}

 		loparent = stack[stacksz - 2];

 		/* Now swap the position of node/node2 in the tree.
 		 * Design note: this is a spot where being an
 		 * intrusive data structure hurts us fairly badly.
 		 * The trees you see in textbooks do this by swapping
 		 * the "data" pointers between the two nodes, but we
 		 * have a few special cases to check.  In principle
 		 * this works by swapping the child pointers between
 		 * the nodes and retargeting the nodes pointing to
 		 * them from their parents, but: (1) the upper node
 		 * may be the root of the tree and not have a parent,
 		 * and (2) the lower node may be a direct child of the
 		 * upper node.  Remember to swap the color bits of the
 		 * two nodes also.  And of course we don't have parent
 		 * pointers, so the stack tracking this structure
 		 * needs to be swapped too!
 		 */
 		if (hiparent != NULL) {
 			set_child(hiparent, get_side(hiparent, node), node2);
 		} else {
 			tree->root = node2;
 		}

 		if (loparent == node) {
 			set_child(node, 0U, get_child(node2, 0U));
 			set_child(node2, 0U, node);
 		} else {
 			set_child(loparent, get_side(loparent, node2), node);
 			tmp = get_child(node, 0U);
 			set_child(node, 0U, get_child(node2, 0U));
 			set_child(node2, 0U, tmp);
 		}

 		set_child(node2, 1U, get_child(node, 1U));
 		set_child(node, 1U, NULL);

 		tmp = stack[stacksz0 - 1];
 		stack[stacksz0 - 1] = stack[stacksz - 1];
 		stack[stacksz - 1] = tmp;

 		enum rb_color ctmp = get_color(node);

 		set_color(node, get_color(node2));
 		set_color(node2, ctmp);
 	}

 	CHECK((get_child(node, 0U) == NULL) ||
 	      (get_child(node, 1U) == NULL));

 	struct rbnode *child = get_child(node, 0U);

 	if (child == NULL) {
 		child = get_child(node, 1U);
 	}

 	/* Removing the root */
 	if (stacksz < 2) {
 		tree->root = child;
 		if (child != NULL) {
 			set_color(child, BLACK);
 		} else {
 			tree->max_depth = 0;
 		}
 		return;
 	}

 	struct rbnode *parent = stack[stacksz - 2];

 	/* Special case: if the node to be removed is childless, then
 	 * we leave it in place while we do the missing black
 	 * rotations, which will replace it with a proper NULL when
 	 * they isolate it.
 	 */
 	if (child == NULL) {
 		if (is_black(node)) {
 			fix_missing_black(stack, stacksz, node);
 		} else {
 			/* Red childless nodes can just be dropped */
 			set_child(parent, get_side(parent, node), NULL);
 		}
 	} else {
 		set_child(parent, get_side(parent, node), child);

 		/* Check colors, if one was red (at least one must have been
 		 * black in a valid tree), then we're done.
 		 */
 		__ASSERT(is_black(node) || is_black(child), "both nodes red?!");
 		if (is_red(node) || is_red(child)) {
 			set_color(child, BLACK);
 		}
 	}

 	/* We may have rotated up into the root! */
 	tree->root = stack[0];
 }

 #ifndef CONFIG_MISRA_SANE
 void z_rb_walk(struct rbnode *node, rb_visit_t visit_fn, void *cookie)
 {
 	if (node != NULL) {
 		z_rb_walk(get_child(node, 0U), visit_fn, cookie);
 		visit_fn(node, cookie);
 		z_rb_walk(get_child(node, 1U), visit_fn, cookie);
 	}
 }
 #endif

 struct rbnode *z_rb_child(struct rbnode *node, uint8_t side)
 {
 	return get_child(node, side);
 }

 int z_rb_is_black(struct rbnode *node)
 {
 	return is_black(node);
 }

 bool rb_contains(struct rbtree *tree, struct rbnode *node)
 {
 	struct rbnode *n = tree->root;

 	while ((n != NULL) && (n != node)) {
 		n = get_child(n, tree->lessthan_fn(n, node));
 	}

 	return n == node;
 }

 /* Pushes the node and its chain of left-side children onto the stack
  * in the foreach struct, returning the last node, which is the next
  * node to iterate.  By construction node will always be a right child
  * or the root, so is_left must be false.
  */
 static inline struct rbnode *stack_left_limb(struct rbnode *n,
 					     struct _rb_foreach *f)
 {
 	f->top++;
 	f->stack[f->top] = n;
 	f->is_left[f->top] = 0U;

 	while ((n = get_child(n, 0U)) != NULL) {
 		f->top++;
 		f->stack[f->top] = n;
 		f->is_left[f->top] = 1;
 	}

 	return f->stack[f->top];
 }

 /* The foreach tracking works via a dynamic stack allocated via
  * alloca().  The current node is found in stack[top] (and its parent
  * is thus stack[top-1]).  The side of each stacked node from its
  * parent is stored in is_left[] (i.e. if is_left[top] is true, then
  * node/stack[top] is the left child of stack[top-1]).  The special
  * case of top == -1 indicates that the stack is uninitialized and we
  * need to push an initial stack starting at the root.
  */
 struct rbnode *z_rb_foreach_next(struct rbtree *tree, struct _rb_foreach *f)
 {
 	struct rbnode *n;

 	if (tree->root == NULL) {
 		return NULL;
 	}

 	/* Initialization condition, pick the leftmost child of the
 	 * root as our first node, initializing the stack on the way.
 	 */
 	if (f->top == -1) {
 		return stack_left_limb(tree->root, f);
 	}

 	/* The next child from a given node is the leftmost child of
 	 * it's right subtree if it has a right child
 	 */
 	n = get_child(f->stack[f->top], 1U);
 	if (n != NULL) {
 		return stack_left_limb(n, f);
 	}

 	/* Otherwise if the node is a left child of its parent, the
 	 * next node is the parent (note that the root is stacked
 	 * above with is_left set to 0, so this condition still works
 	 * even if node has no parent).
 	 */
 	if (f->is_left[f->top] != 0U) {
 		return f->stack[--f->top];
 	}

 	/* If we had no left tree and are a right child then our
 	 * parent was already walked, so walk up the stack looking for
 	 * a left child (whose parent is unwalked, and thus next).
 	 */
 	while ((f->top > 0) && (f->is_left[f->top] == 0U)) {
 		f->top--;
 	}

 	f->top--;
 	return (f->top >= 0) ? f->stack[f->top] : NULL;
 }
	/*
	* Copyright (c) 2018 Intel Corporation
	*
	* SPDX-License-Identifier: Apache-2.0
	*/

	/* These assertions are very useful when debugging the tree code
	* itself, but produce significant performance degradation as they are
	* checked many times per operation. Leave them off unless you're
	* working on the rbtree code itself
	*/
	#define CHECK(n) /**/
	/* #define CHECK(n) __ASSERT_NO_MSG(n) */

	#include <zephyr/kernel.h>
	#include <zephyr/sys/rb.h>
	#include <stdbool.h>

	enum rb_color { RED = 0U, BLACK = 1U };

	static struct rbnode get_child(struct rbnode n, uint8_t side)
	{
	CHECK(n);
	if (side != 0U) {
	return n->children[1];
	}

	uintptr_t l = (uintptr_t) n->children[0];

	l &= ~1UL;
	return (struct rbnode *) l;
	}

	static void set_child(struct rbnode n, uint8_t side, void val)
	{
	CHECK(n);
	if (side != 0U) {
	n->children[1] = val;
	} else {
	uintptr_t old = (uintptr_t) n->children[0];
	uintptr_t new = (uintptr_t) val;

	n->children[0] = (void *) (new \| (old & 1UL));
	}
	}

	static enum rb_color get_color(struct rbnode *n)
	{
	CHECK(n);
	return ((uintptr_t)n->children[0]) & 1UL;
	}

	static bool is_black(struct rbnode *n)
	{
	return get_color(n) == BLACK;
	}

	static bool is_red(struct rbnode *n)
	{
	return get_color(n) == RED;
	}

	static void set_color(struct rbnode *n, enum rb_color color)
	{
	CHECK(n);

	uintptr_t p = (void ) &n->children[0];

	p = (p & ~1UL) \| (uint8_t)color;
	}

	/* Searches the tree down to a node that is either identical with the
	* "node" argument or has an empty/leaf child pointer where "node"
	* should be, leaving all nodes found in the resulting stack. Note
	* that tree must not be empty and that stack should be allocated to
	* contain at least tree->max_depth entries! Returns the number of
	* entries pushed onto the stack.
	*/
	static int find_and_stack(struct rbtree tree, struct rbnode node,
	struct rbnode **stack)
	{
	int sz = 0;

	stack[sz++] = tree->root;

	while (stack[sz - 1] != node) {
	uint8_t side = tree->lessthan_fn(node, stack[sz - 1]) ? 0U : 1U;
	struct rbnode *ch = get_child(stack[sz - 1], side);

	if (ch != NULL) {
	stack[sz++] = ch;
	} else {
	break;
	}
	}

	return sz;
	}

	struct rbnode z_rb_get_minmax(struct rbtree tree, uint8_t side)
	{
	struct rbnode *n;

	for (n = tree->root; (n != NULL) && (get_child(n, side) != NULL);
	n = get_child(n, side)) {
	;
	}
	return n;
	}

	static uint8_t get_side(struct rbnode parent, struct rbnode child)
	{
	CHECK(get_child(parent, 0U) == child \|\| get_child(parent, 1U) == child);

	return (get_child(parent, 1U) == child) ? 1U : 0U;
	}

	/* Swaps the position of the two nodes at the top of the provided
	* stack, modifying the stack accordingly. Does not change the color
	* of either node. That is, it effects the following transition (or
	* its mirror if N is on the other side of P, of course):
	*
	* P N
	* N c --> a P
	* a b b c
	*
	*/
	static void rotate(struct rbnode **stack, int stacksz)
	{
	CHECK(stacksz >= 2);

	struct rbnode *parent = stack[stacksz - 2];
	struct rbnode *child = stack[stacksz - 1];
	uint8_t side = get_side(parent, child);
	struct rbnode *a = get_child(child, side);
	struct rbnode *b = get_child(child, (side == 0U) ? 1U : 0U);

	if (stacksz >= 3) {
	struct rbnode *grandparent = stack[stacksz - 3];

	set_child(grandparent, get_side(grandparent, parent), child);
	}

	set_child(child, side, a);
	set_child(child, (side == 0U) ? 1U : 0U, parent);
	set_child(parent, side, b);
	stack[stacksz - 2] = child;
	stack[stacksz - 1] = parent;
	}

	/* The node at the top of the provided stack is red, and its parent is
	* too. Iteratively fix the tree so it becomes a valid red black tree
	* again
	*/
	static void fix_extra_red(struct rbnode **stack, int stacksz)
	{
	while (stacksz > 1) {
	struct rbnode *node = stack[stacksz - 1];
	struct rbnode *parent = stack[stacksz - 2];

	/* Correct child colors are a precondition of the loop */
	CHECK((get_child(node, 0U) == NULL) \|\|
	is_black(get_child(node, 0U)));
	CHECK((get_child(node, 1U) == NULL) \|\|
	is_black(get_child(node, 1U)));

	if (is_black(parent)) {
	return;
	}

	/* We are guaranteed to have a grandparent if our
	* parent is red, as red nodes cannot be the root
	*/
	CHECK(stacksz >= 2);

	struct rbnode *grandparent = stack[stacksz - 3];
	uint8_t side = get_side(grandparent, parent);
	struct rbnode *aunt = get_child(grandparent,
	(side == 0U) ? 1U : 0U);

	if ((aunt != NULL) && is_red(aunt)) {
	set_color(grandparent, RED);
	set_color(parent, BLACK);
	set_color(aunt, BLACK);

	/* We colored the grandparent red, which might
	* have a red parent, so continue iterating
	* from there.
	*/
	stacksz -= 2;
	continue;
	}

	/* We can rotate locally to fix the whole tree. First
	* make sure that node is on the same side of parent
	* as parent is of grandparent.
	*/
	uint8_t parent_side = get_side(parent, node);

	if (parent_side != side) {
	rotate(stack, stacksz);
	}

	/* Rotate the grandparent with parent, swapping colors */
	rotate(stack, stacksz - 1);
	set_color(stack[stacksz - 3], BLACK);
	set_color(stack[stacksz - 2], RED);
	return;
	}

	/* If we exit the loop, it's because our node is now the root,
	* which must be black.
	*/
	set_color(stack[0], BLACK);
	}

	void rb_insert(struct rbtree tree, struct rbnode node)
	{
	set_child(node, 0U, NULL);
	set_child(node, 1U, NULL);

	if (tree->root == NULL) {
	tree->root = node;
	tree->max_depth = 1;
	set_color(node, BLACK);
	return;
	}

	#ifdef CONFIG_MISRA_SANE
	struct rbnode **stack = &tree->iter_stack[0];
	#else
	struct rbnode *stack[tree->max_depth + 1];
	#endif

	int stacksz = find_and_stack(tree, node, stack);

	struct rbnode *parent = stack[stacksz - 1];

	uint8_t side = tree->lessthan_fn(node, parent) ? 0U : 1U;

	set_child(parent, side, node);
	set_color(node, RED);

	stack[stacksz++] = node;
	fix_extra_red(stack, stacksz);

	if (stacksz > tree->max_depth) {
	tree->max_depth = stacksz;
	}

	/* We may have rotated up into the root! */
	tree->root = stack[0];
	CHECK(is_black(tree->root));
	}

	/* Called for a node N (at the top of the stack) which after a
	* deletion operation is "missing a black" in its subtree. By
	* construction N must be black (because if it was red it would be
	* trivially fixed by recoloring and we wouldn't be here). Fixes up
	* the tree to preserve red/black rules. The "null_node" pointer is
	* for situations where we are removing a childless black node. The
	* tree munging needs a real node for simplicity, so we use it and
	* then clean it up (replace it with a simple NULL child in the
	* parent) when finished.
	*/
	static void fix_missing_black(struct rbnode **stack, int stacksz,
	struct rbnode *null_node)
	{
	/* Loop upward until we reach the root */
	while (stacksz > 1) {
	struct rbnode c0, c1, inner, outer;
	struct rbnode *n = stack[stacksz - 1];
	struct rbnode *parent = stack[stacksz - 2];
	uint8_t n_side = get_side(parent, n);
	struct rbnode *sib = get_child(parent,
	(n_side == 0U) ? 1U : 0U);

	CHECK(is_black(n));

	/* Guarantee the sibling is black, rotating N down a
	* level if needed (after rotate() our parent is the
	* child of our previous-sibling, so N is lower in the
	* tree)
	*/
	if (!is_black(sib)) {
	stack[stacksz - 1] = sib;
	rotate(stack, stacksz);
	set_color(parent, RED);
	set_color(sib, BLACK);
	stack[stacksz++] = n;

	parent = stack[stacksz - 2];
	sib = get_child(parent, (n_side == 0U) ? 1U : 0U);
	}

	CHECK(sib);

	/* Cases where the sibling has only black children
	* have simple resolutions
	*/
	c0 = get_child(sib, 0U);
	c1 = get_child(sib, 1U);
	if (((c0 == NULL) \|\| is_black(c0)) && ((c1 == NULL) \|\|
	is_black(c1))) {
	if (n == null_node) {
	set_child(parent, n_side, NULL);
	}

	set_color(sib, RED);
	if (is_black(parent)) {
	/* Balance the sibling's subtree by
	* coloring it red, then our parent
	* has a missing black so iterate
	* upward
	*/
	stacksz--;
	continue;
	} else {
	/* Recoloring makes the whole tree OK */
	set_color(parent, BLACK);
	return;
	}
	}

	CHECK((c0 && is_red(c0)) \|\| (c1 && is_red(c1)));

	/* We know sibling has at least one red child. Fix it
	* so that the far/outer position (i.e. on the
	* opposite side from N) is definitely red.
	*/
	outer = get_child(sib, (n_side == 0U) ? 1U : 0U);
	if (!((outer != NULL) && is_red(outer))) {
	inner = get_child(sib, n_side);

	stack[stacksz - 1] = sib;
	stack[stacksz++] = inner;
	rotate(stack, stacksz);
	set_color(sib, RED);
	set_color(inner, BLACK);

	/* Restore stack state to have N on the top
	* and make sib reflect the new sibling
	*/
	sib = stack[stacksz - 2];
	outer = get_child(sib, (n_side == 0U) ? 1U : 0U);
	stack[stacksz - 2] = n;
	stacksz--;
	}

	/* Finally, the sibling must have a red child in the
	* far/outer slot. We can rotate sib with our parent
	* and recolor to produce a valid tree.
	*/
	CHECK(is_red(outer));
	set_color(sib, get_color(parent));
	set_color(parent, BLACK);
	set_color(outer, BLACK);
	stack[stacksz - 1] = sib;
	rotate(stack, stacksz);
	if (n == null_node) {
	set_child(parent, n_side, NULL);
	}
	return;
	}
	}

	void rb_remove(struct rbtree tree, struct rbnode node)
	{
	struct rbnode *tmp;
	#ifdef CONFIG_MISRA_SANE
	struct rbnode **stack = &tree->iter_stack[0];
	#else
	struct rbnode *stack[tree->max_depth + 1];
	#endif

	int stacksz = find_and_stack(tree, node, stack);

	if (node != stack[stacksz - 1]) {
	return;
	}

	/* We can only remove a node with zero or one child, if we
	* have two then pick the "biggest" child of side 0 (smallest
	* of 1 would work too) and swap our spot in the tree with
	* that one
	*/
	if ((get_child(node, 0U) != NULL) && (get_child(node, 1U) != NULL)) {
	int stacksz0 = stacksz;
	struct rbnode hiparent, loparent;
	struct rbnode *node2 = get_child(node, 0U);

	hiparent = (stacksz > 1) ? stack[stacksz - 2] : NULL;
	stack[stacksz++] = node2;
	while (get_child(node2, 1U) != NULL) {
	node2 = get_child(node2, 1U);
	stack[stacksz++] = node2;
	}

	loparent = stack[stacksz - 2];

	/* Now swap the position of node/node2 in the tree.
	* Design note: this is a spot where being an
	* intrusive data structure hurts us fairly badly.
	* The trees you see in textbooks do this by swapping
	* the "data" pointers between the two nodes, but we
	* have a few special cases to check. In principle
	* this works by swapping the child pointers between
	* the nodes and retargeting the nodes pointing to
	* them from their parents, but: (1) the upper node
	* may be the root of the tree and not have a parent,
	* and (2) the lower node may be a direct child of the
	* upper node. Remember to swap the color bits of the
	* two nodes also. And of course we don't have parent
	* pointers, so the stack tracking this structure
	* needs to be swapped too!
	*/
	if (hiparent != NULL) {
	set_child(hiparent, get_side(hiparent, node), node2);
	} else {
	tree->root = node2;
	}

	if (loparent == node) {
	set_child(node, 0U, get_child(node2, 0U));
	set_child(node2, 0U, node);
	} else {
	set_child(loparent, get_side(loparent, node2), node);
	tmp = get_child(node, 0U);
	set_child(node, 0U, get_child(node2, 0U));
	set_child(node2, 0U, tmp);
	}

	set_child(node2, 1U, get_child(node, 1U));
	set_child(node, 1U, NULL);

	tmp = stack[stacksz0 - 1];
	stack[stacksz0 - 1] = stack[stacksz - 1];
	stack[stacksz - 1] = tmp;

	enum rb_color ctmp = get_color(node);

	set_color(node, get_color(node2));
	set_color(node2, ctmp);
	}

	CHECK((get_child(node, 0U) == NULL) \|\|
	(get_child(node, 1U) == NULL));

	struct rbnode *child = get_child(node, 0U);

	if (child == NULL) {
	child = get_child(node, 1U);
	}

	/* Removing the root */
	if (stacksz < 2) {
	tree->root = child;
	if (child != NULL) {
	set_color(child, BLACK);
	} else {
	tree->max_depth = 0;
	}
	return;
	}

	struct rbnode *parent = stack[stacksz - 2];

	/* Special case: if the node to be removed is childless, then
	* we leave it in place while we do the missing black
	* rotations, which will replace it with a proper NULL when
	* they isolate it.
	*/
	if (child == NULL) {
	if (is_black(node)) {
	fix_missing_black(stack, stacksz, node);
	} else {
	/* Red childless nodes can just be dropped */
	set_child(parent, get_side(parent, node), NULL);
	}
	} else {
	set_child(parent, get_side(parent, node), child);

	/* Check colors, if one was red (at least one must have been
	* black in a valid tree), then we're done.
	*/
	__ASSERT(is_black(node) \|\| is_black(child), "both nodes red?!");
	if (is_red(node) \|\| is_red(child)) {
	set_color(child, BLACK);
	}
	}

	/* We may have rotated up into the root! */
	tree->root = stack[0];
	}

	#ifndef CONFIG_MISRA_SANE
	void z_rb_walk(struct rbnode node, rb_visit_t visit_fn, void cookie)
	{
	if (node != NULL) {
	z_rb_walk(get_child(node, 0U), visit_fn, cookie);
	visit_fn(node, cookie);
	z_rb_walk(get_child(node, 1U), visit_fn, cookie);
	}
	}
	#endif

	struct rbnode z_rb_child(struct rbnode node, uint8_t side)
	{
	return get_child(node, side);
	}

	int z_rb_is_black(struct rbnode *node)
	{
	return is_black(node);
	}

	bool rb_contains(struct rbtree tree, struct rbnode node)
	{
	struct rbnode *n = tree->root;

	while ((n != NULL) && (n != node)) {
	n = get_child(n, tree->lessthan_fn(n, node));
	}

	return n == node;
	}

	/* Pushes the node and its chain of left-side children onto the stack
	* in the foreach struct, returning the last node, which is the next
	* node to iterate. By construction node will always be a right child
	* or the root, so is_left must be false.
	*/
	static inline struct rbnode stack_left_limb(struct rbnode n,
	struct _rb_foreach *f)
	{
	f->top++;
	f->stack[f->top] = n;
	f->is_left[f->top] = 0U;

	while ((n = get_child(n, 0U)) != NULL) {
	f->top++;
	f->stack[f->top] = n;
	f->is_left[f->top] = 1;
	}

	return f->stack[f->top];
	}

	/* The foreach tracking works via a dynamic stack allocated via
	* alloca(). The current node is found in stack[top] (and its parent
	* is thus stack[top-1]). The side of each stacked node from its
	* parent is stored in is_left[] (i.e. if is_left[top] is true, then
	* node/stack[top] is the left child of stack[top-1]). The special
	* case of top == -1 indicates that the stack is uninitialized and we
	* need to push an initial stack starting at the root.
	*/
	struct rbnode z_rb_foreach_next(struct rbtree tree, struct _rb_foreach *f)
	{
	struct rbnode *n;

	if (tree->root == NULL) {
	return NULL;
	}

	/* Initialization condition, pick the leftmost child of the
	* root as our first node, initializing the stack on the way.
	*/
	if (f->top == -1) {
	return stack_left_limb(tree->root, f);
	}

	/* The next child from a given node is the leftmost child of
	* it's right subtree if it has a right child
	*/
	n = get_child(f->stack[f->top], 1U);
	if (n != NULL) {
	return stack_left_limb(n, f);
	}

	/* Otherwise if the node is a left child of its parent, the
	* next node is the parent (note that the root is stacked
	* above with is_left set to 0, so this condition still works
	* even if node has no parent).
	*/
	if (f->is_left[f->top] != 0U) {
	return f->stack[--f->top];
	}

	/* If we had no left tree and are a right child then our
	* parent was already walked, so walk up the stack looking for
	* a left child (whose parent is unwalked, and thus next).
	*/
	while ((f->top > 0) && (f->is_left[f->top] == 0U)) {
	f->top--;
	}

	f->top--;
	return (f->top >= 0) ? f->stack[f->top] : NULL;
	}