mirror of
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457 lines
8.9 KiB
Go
457 lines
8.9 KiB
Go
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// Copyright 2010 Petar Maymounkov. All rights reserved.
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// Use of this source code is governed by a BSD-style
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// license that can be found in the LICENSE file.
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// A Left-Leaning Red-Black (LLRB) implementation of 2-3 balanced binary search trees,
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// based on the following work:
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//
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// http://www.cs.princeton.edu/~rs/talks/LLRB/08Penn.pdf
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// http://www.cs.princeton.edu/~rs/talks/LLRB/LLRB.pdf
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// http://www.cs.princeton.edu/~rs/talks/LLRB/Java/RedBlackBST.java
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//
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// 2-3 trees (and the run-time equivalent 2-3-4 trees) are the de facto standard BST
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// algoritms found in implementations of Python, Java, and other libraries. The LLRB
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// implementation of 2-3 trees is a recent improvement on the traditional implementation,
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// observed and documented by Robert Sedgewick.
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//
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package llrb
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// Tree is a Left-Leaning Red-Black (LLRB) implementation of 2-3 trees
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type LLRB struct {
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count int
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root *Node
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}
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type Node struct {
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Item
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Left, Right *Node // Pointers to left and right child nodes
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Black bool // If set, the color of the link (incoming from the parent) is black
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// In the LLRB, new nodes are always red, hence the zero-value for node
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}
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type Item interface {
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Less(than Item) bool
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}
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//
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func less(x, y Item) bool {
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if x == pinf {
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return false
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}
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if x == ninf {
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return true
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}
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return x.Less(y)
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}
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// Inf returns an Item that is "bigger than" any other item, if sign is positive.
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// Otherwise it returns an Item that is "smaller than" any other item.
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func Inf(sign int) Item {
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if sign == 0 {
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panic("sign")
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}
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if sign > 0 {
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return pinf
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}
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return ninf
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}
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var (
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ninf = nInf{}
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pinf = pInf{}
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)
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type nInf struct{}
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func (nInf) Less(Item) bool {
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return true
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}
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type pInf struct{}
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func (pInf) Less(Item) bool {
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return false
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}
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// New allocates a new tree
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func New() *LLRB {
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return &LLRB{}
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}
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// SetRoot sets the root node of the tree.
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// It is intended to be used by functions that deserialize the tree.
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func (t *LLRB) SetRoot(r *Node) {
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t.root = r
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}
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// Root returns the root node of the tree.
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// It is intended to be used by functions that serialize the tree.
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func (t *LLRB) Root() *Node {
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return t.root
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}
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// Len returns the number of nodes in the tree.
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func (t *LLRB) Len() int { return t.count }
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// Has returns true if the tree contains an element whose order is the same as that of key.
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func (t *LLRB) Has(key Item) bool {
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return t.Get(key) != nil
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}
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// Get retrieves an element from the tree whose order is the same as that of key.
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func (t *LLRB) Get(key Item) Item {
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h := t.root
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for h != nil {
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switch {
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case less(key, h.Item):
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h = h.Left
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case less(h.Item, key):
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h = h.Right
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default:
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return h.Item
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}
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}
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return nil
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}
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// Min returns the minimum element in the tree.
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func (t *LLRB) Min() Item {
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h := t.root
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if h == nil {
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return nil
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}
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for h.Left != nil {
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h = h.Left
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}
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return h.Item
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}
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// Max returns the maximum element in the tree.
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func (t *LLRB) Max() Item {
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h := t.root
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if h == nil {
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return nil
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}
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for h.Right != nil {
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h = h.Right
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}
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return h.Item
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}
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func (t *LLRB) ReplaceOrInsertBulk(items ...Item) {
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for _, i := range items {
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t.ReplaceOrInsert(i)
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}
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}
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func (t *LLRB) InsertNoReplaceBulk(items ...Item) {
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for _, i := range items {
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t.InsertNoReplace(i)
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}
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}
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// ReplaceOrInsert inserts item into the tree. If an existing
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// element has the same order, it is removed from the tree and returned.
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func (t *LLRB) ReplaceOrInsert(item Item) Item {
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if item == nil {
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panic("inserting nil item")
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}
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var replaced Item
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t.root, replaced = t.replaceOrInsert(t.root, item)
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t.root.Black = true
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if replaced == nil {
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t.count++
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}
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return replaced
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}
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func (t *LLRB) replaceOrInsert(h *Node, item Item) (*Node, Item) {
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if h == nil {
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return newNode(item), nil
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}
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h = walkDownRot23(h)
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var replaced Item
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if less(item, h.Item) { // BUG
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h.Left, replaced = t.replaceOrInsert(h.Left, item)
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} else if less(h.Item, item) {
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h.Right, replaced = t.replaceOrInsert(h.Right, item)
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} else {
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replaced, h.Item = h.Item, item
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}
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h = walkUpRot23(h)
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return h, replaced
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}
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// InsertNoReplace inserts item into the tree. If an existing
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// element has the same order, both elements remain in the tree.
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func (t *LLRB) InsertNoReplace(item Item) {
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if item == nil {
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panic("inserting nil item")
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}
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t.root = t.insertNoReplace(t.root, item)
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t.root.Black = true
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t.count++
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}
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func (t *LLRB) insertNoReplace(h *Node, item Item) *Node {
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if h == nil {
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return newNode(item)
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}
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h = walkDownRot23(h)
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if less(item, h.Item) {
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h.Left = t.insertNoReplace(h.Left, item)
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} else {
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h.Right = t.insertNoReplace(h.Right, item)
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}
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return walkUpRot23(h)
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}
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// Rotation driver routines for 2-3 algorithm
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func walkDownRot23(h *Node) *Node { return h }
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func walkUpRot23(h *Node) *Node {
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if isRed(h.Right) && !isRed(h.Left) {
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h = rotateLeft(h)
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}
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if isRed(h.Left) && isRed(h.Left.Left) {
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h = rotateRight(h)
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}
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if isRed(h.Left) && isRed(h.Right) {
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flip(h)
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}
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return h
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}
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// Rotation driver routines for 2-3-4 algorithm
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func walkDownRot234(h *Node) *Node {
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if isRed(h.Left) && isRed(h.Right) {
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flip(h)
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}
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return h
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}
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func walkUpRot234(h *Node) *Node {
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if isRed(h.Right) && !isRed(h.Left) {
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h = rotateLeft(h)
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}
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if isRed(h.Left) && isRed(h.Left.Left) {
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h = rotateRight(h)
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}
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return h
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}
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// DeleteMin deletes the minimum element in the tree and returns the
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// deleted item or nil otherwise.
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func (t *LLRB) DeleteMin() Item {
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var deleted Item
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t.root, deleted = deleteMin(t.root)
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if t.root != nil {
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t.root.Black = true
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}
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if deleted != nil {
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t.count--
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}
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return deleted
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}
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// deleteMin code for LLRB 2-3 trees
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func deleteMin(h *Node) (*Node, Item) {
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if h == nil {
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return nil, nil
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}
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if h.Left == nil {
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return nil, h.Item
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}
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if !isRed(h.Left) && !isRed(h.Left.Left) {
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h = moveRedLeft(h)
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}
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var deleted Item
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h.Left, deleted = deleteMin(h.Left)
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return fixUp(h), deleted
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}
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// DeleteMax deletes the maximum element in the tree and returns
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// the deleted item or nil otherwise
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func (t *LLRB) DeleteMax() Item {
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var deleted Item
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t.root, deleted = deleteMax(t.root)
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if t.root != nil {
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t.root.Black = true
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}
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if deleted != nil {
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t.count--
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}
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return deleted
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}
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func deleteMax(h *Node) (*Node, Item) {
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if h == nil {
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return nil, nil
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}
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if isRed(h.Left) {
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h = rotateRight(h)
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}
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if h.Right == nil {
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return nil, h.Item
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}
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if !isRed(h.Right) && !isRed(h.Right.Left) {
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h = moveRedRight(h)
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}
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var deleted Item
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h.Right, deleted = deleteMax(h.Right)
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return fixUp(h), deleted
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}
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// Delete deletes an item from the tree whose key equals key.
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// The deleted item is return, otherwise nil is returned.
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func (t *LLRB) Delete(key Item) Item {
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var deleted Item
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t.root, deleted = t.delete(t.root, key)
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if t.root != nil {
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t.root.Black = true
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}
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if deleted != nil {
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t.count--
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}
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return deleted
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}
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func (t *LLRB) delete(h *Node, item Item) (*Node, Item) {
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var deleted Item
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if h == nil {
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return nil, nil
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}
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if less(item, h.Item) {
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if h.Left == nil { // item not present. Nothing to delete
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return h, nil
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}
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if !isRed(h.Left) && !isRed(h.Left.Left) {
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h = moveRedLeft(h)
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}
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h.Left, deleted = t.delete(h.Left, item)
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} else {
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if isRed(h.Left) {
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h = rotateRight(h)
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}
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// If @item equals @h.Item and no right children at @h
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if !less(h.Item, item) && h.Right == nil {
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return nil, h.Item
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}
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// PETAR: Added 'h.Right != nil' below
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if h.Right != nil && !isRed(h.Right) && !isRed(h.Right.Left) {
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h = moveRedRight(h)
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}
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// If @item equals @h.Item, and (from above) 'h.Right != nil'
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if !less(h.Item, item) {
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var subDeleted Item
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h.Right, subDeleted = deleteMin(h.Right)
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if subDeleted == nil {
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panic("logic")
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}
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deleted, h.Item = h.Item, subDeleted
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} else { // Else, @item is bigger than @h.Item
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h.Right, deleted = t.delete(h.Right, item)
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}
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}
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return fixUp(h), deleted
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}
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// Internal node manipulation routines
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func newNode(item Item) *Node { return &Node{Item: item} }
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func isRed(h *Node) bool {
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if h == nil {
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return false
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}
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return !h.Black
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}
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func rotateLeft(h *Node) *Node {
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x := h.Right
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if x.Black {
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panic("rotating a black link")
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}
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h.Right = x.Left
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x.Left = h
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x.Black = h.Black
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h.Black = false
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return x
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}
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func rotateRight(h *Node) *Node {
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x := h.Left
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if x.Black {
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panic("rotating a black link")
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}
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h.Left = x.Right
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x.Right = h
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x.Black = h.Black
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h.Black = false
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return x
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}
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// REQUIRE: Left and Right children must be present
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func flip(h *Node) {
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h.Black = !h.Black
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h.Left.Black = !h.Left.Black
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h.Right.Black = !h.Right.Black
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}
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// REQUIRE: Left and Right children must be present
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func moveRedLeft(h *Node) *Node {
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flip(h)
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if isRed(h.Right.Left) {
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h.Right = rotateRight(h.Right)
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h = rotateLeft(h)
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flip(h)
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}
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return h
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}
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// REQUIRE: Left and Right children must be present
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func moveRedRight(h *Node) *Node {
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flip(h)
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if isRed(h.Left.Left) {
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h = rotateRight(h)
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flip(h)
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}
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return h
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}
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func fixUp(h *Node) *Node {
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if isRed(h.Right) {
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h = rotateLeft(h)
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}
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if isRed(h.Left) && isRed(h.Left.Left) {
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h = rotateRight(h)
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}
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if isRed(h.Left) && isRed(h.Right) {
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flip(h)
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}
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return h
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}
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