左左型本节我们不会主要讲解AVL树的原理,只讨论AVL树的四种旋转的情形,有关AVL树的基本知识请看其他博客。
对于左左型的AVL树,我们只需对它进行一次左旋即可:
void AVLTree::SingleRotateWithLeft(TreeNode*& root)
{//左左型
TreeNode* K2 = root;
TreeNode* K1 = K2->left;
K2->left = K1->right;
K1->right = K2;
//K1经过旋转后成为了新的根节点,K2是其右孩子
K2->height = max(Height(K2->left), Height(K2->right)) + 1;
K1->height = max(Height(K1->left), K2->height) + 1;
root = K1; //根节点重新确认
}
对于右右型的AVL树,我们只需对它进行一次左旋即可:
void AVLTree::SingleRotateWithRight(TreeNode*& root)
{//右右型
TreeNode* K1 = root;
TreeNode* K2 = K1->right;
K1->right = K2->left;
K2->left = K1;
//K1经过旋转后成为了新的根节点,K2是其左孩子
K1->height = max(Height(K1->left), Height(K1->right)) + 1;
K2->height = max(K1->height, Height(K2->right)) + 1;
root = K2;
}
对于左右型的AVL树,我们只需对它进行一次右旋,然后进行一次左旋即可:
void AVLTree::DoubleRotateWithLeft(TreeNode*& root)
{//左右型
TreeNode* K3 = root;
//1. 先右旋
SingleRotateWithRight(K3->left);
//2. 后左旋
SingleRotateWithLeft(K3);
root = K3;
}
对于右左型的AVL树,我们只需对它进行一次左旋,然后进行一次右旋即可:
void AVLTree::DoubleRotateWithRight(TreeNode*& root)
{//右左型
TreeNode* K3 = root;
//1. 先左旋
SingleRotateWithLeft(K3->right);
//2. 再右旋
SingleRotateWithRight(K3);
root = K3;
}#includeusing namespace std;
using Type = int;
struct TreeNode
{Type data;
TreeNode* left;
TreeNode* right;
int height = 0;
TreeNode(const Type& data, TreeNode* left = nullptr, TreeNode* right = nullptr, const int& height = 0)
:data(data), left(left), right(right),height(height) {}
};
class AVLTree
{public:
AVLTree();
~AVLTree();
//计算AVL树的节点高度
static int Height(TreeNode* node);
void insert(const Type& data);
private:
void SingleRotateWithLeft(TreeNode*& root);
void SingleRotateWithRight(TreeNode*& root);
void DoubleRotateWithLeft(TreeNode*& root);
void DoubleRotateWithRight(TreeNode*& root);
void _insert(const Type& data, TreeNode*& root);
private:
TreeNode* root;
};
int main()
{AVLTree t1, t2, t3, t4;
//右右型
t1.insert(1);
t1.insert(2);
t1.insert(3);
//左左型
t2.insert(3);
t2.insert(2);
t2.insert(1);
//左右型
t3.insert(3);
t3.insert(1);
t3.insert(2);
//右左型
t4.insert(1);
t4.insert(3);
t4.insert(2);
AVLTree t;
vectorvec{4,2,6,1,3,5,7,16,15,14,13,12,11,10,8,9 };
for (int i = 0; i< vec.size(); i++)
{t.insert(vec[i]);
}
return 0;
}
AVLTree::AVLTree()
{root = nullptr;
}
AVLTree::~AVLTree()
{//销毁整棵树
}
int AVLTree::Height(TreeNode* node)
{if (node == nullptr)
{return -1;
}
else
{return node->height;
}
}
void AVLTree::insert(const Type& data)
{_insert(data, root);
}
void AVLTree::SingleRotateWithLeft(TreeNode*& root)
{//左左型
TreeNode* K2 = root;
TreeNode* K1 = K2->left;
K2->left = K1->right;
K1->right = K2;
//K1经过旋转后成为了新的根节点,K2是其右孩子
K2->height = max(Height(K2->left), Height(K2->right)) + 1;
K1->height = max(Height(K1->left), K2->height) + 1;
root = K1;
}
void AVLTree::SingleRotateWithRight(TreeNode*& root)
{//右右型
TreeNode* K1 = root;
TreeNode* K2 = K1->right;
K1->right = K2->left;
K2->left = K1;
//K1经过旋转后成为了新的根节点,K2是其左孩子
K1->height = max(Height(K1->left), Height(K1->right)) + 1;
K2->height = max(K1->height, Height(K2->right)) + 1;
root = K2;
}
void AVLTree::DoubleRotateWithLeft(TreeNode*& root)
{//左右型
TreeNode* K3 = root;
//1. 先右旋
SingleRotateWithRight(K3->left);
//2. 后左旋
SingleRotateWithLeft(K3);
root = K3;
}
void AVLTree::DoubleRotateWithRight(TreeNode*& root)
{//右左型
TreeNode* K3 = root;
//1. 先左旋
SingleRotateWithLeft(K3->right);
//2. 再右旋
SingleRotateWithRight(K3);
root = K3;
}
void AVLTree::_insert(const Type& data, TreeNode*& root)
{if (root == nullptr)
{root = new TreeNode{data };
return;
}
if (data< root->data)
{//左子树插入
_insert(data, root->left);
if (Height(root->left) - Height(root->right) == 2)
{ if (data< root->left->data)
{ SingleRotateWithLeft(root); //单旋转:左左型
}
else
{ DoubleRotateWithLeft(root); //双旋转:左右型
}
}
}
else if (data >root->data)
{//右子树插入
_insert(data, root->right);
if (Height(root->right) - Height(root->left) == 2)
{ if (data >root->right->data)
{ SingleRotateWithRight(root); //单旋转:右右型
}
else
{ DoubleRotateWithRight(root); //双旋转:右左型
}
}
}
//否则树已经在节点中了,我们什么也不做
//update树节点的高度
root->height = max(Height(root->left), Height(root->right)) + 1;
}
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