定义
二分搜索树是二叉树(不包含重复元素)。
二分搜索树的每个节点的值,大于左子树的所有节点的值,小于其右子树的所有节点的值。
每一棵子树也是二分搜索树。
二叉树搜索树必须要有比较,继承Comparable类
插入元素
package com.dsideal; public class BST<E extends Comparable<E>> { private class Node { private E e; //左右孩子 private Node left,right; public Node(E e) { this.e = e; left = null; right = null; } } //根节点 private Node root; //二叉树元素个数 private int size; private BST() { root = null; size = 0; } //二叉树有几个节点 public int size() { return size; } //二叉树是否为空 public boolean isEmpty() { return size == 0; } public void add(E e) { root = add(root,e); } //向根添加元素 private Node add(Node node,E e) { if(node == null) { size ++; return new Node(e); } if (e.compareTo(node.e) < 0) { node.left = add(node.left,e); }else if(e.compareTo(node.e) > 0) { node.right = add(node.right,e); } return node; } }
二分搜索树的前序遍历,访问该节点是在左右子树之前。
private void preOrder(Node node)
{
if (node == null)
{
return;
}
System.out.println(node.e);
preOrder(node.left);
preOrder(node.right);
}
二分搜索树的中序遍历,结果是排序的。
//二分搜索树的中序排序 public void inOrder() { inOrder(root); } private void inOrder(Node node) { if (node == null) { return; } inOrder(node.left); System.out.println(node.e); inOrder(node.right); }
二分搜索树的后序遍历
//二分搜索树的后序遍历 public void postOrder() { preOrder(root); } public void postOrder(Node node) { if (node == null) { return; } preOrder(node.left); preOrder(node.right); System.out.println(node.e); }
二分搜索树前序遍历非递归实现
public void preOrderNR() { Stack<Node> stack = new Stack<>(); stack.push(root); while (!stack.isEmpty()) { Node cur = stack.pop(); System.out.println(cur.e); if (cur.right != null) { stack.push(cur.right); } if (cur.left != null) { stack.push(cur.left); } } }
二分搜索树的层序遍历,最短路径
public void levelOrder() { Queue<Node> queue = new LinkedList<>(); queue.add(root); while (!queue.isEmpty()) { Node cur = queue.remove(); System.out.println(cur.e); if (cur.left != null) { queue.add(cur.left); } if (cur.right != null) { queue.add(cur.right); } } }
重写toString
@Override
public String toString()
{
StringBuffer res = new StringBuffer();
generateBSTString(root,0,res);
return res.toString();
}
private void generateBSTString(Node node, int depth, StringBuffer res)
{
if (node == null)
{
res.append(generateBSTString(depth) + "null
");
return;
}
res.append(generateBSTString(depth) + node.e + "
");
generateBSTString(node.left,depth + 1,res);
generateBSTString(node.right,depth + 1,res);
}
public String generateBSTString(int depth)
{
StringBuffer res = new StringBuffer(" ");
for (int i = 0; i < depth; i++) {
res.append("--");
}
return res.toString();
}
删除最大值和最小值
//二分数的最大值 public E maxNode() { if (isEmpty()) { throw new IllegalArgumentException("BST is empty"); } return maxNode(root).e; } private Node maxNode(Node node) { if (node.right == null) { return node; } return maxNode(node.right); } //二分数的最小值 public E minNode() { if (isEmpty()) { throw new IllegalArgumentException("BST is empty"); } return minNode(root).e; } private Node minNode(Node node) { if (root.left == null) { return node; } return minNode(node.left); } public E removeMax() { E cur = maxNode(); root = removeMax(root); return cur; } //删除最大值,返回根 private Node removeMax(Node node) { if (node.right == null) { Node rightNode = node.left; node.left = null; size --; return rightNode; } node.right = removeMax(node.right); return node; } public E removeMin() { E cur = minNode(); root = removeMin(root); return null; } private Node removeMin(Node node) { if (node.left == null) { Node leftNode = node.right; node.right = null; size--; return leftNode; } node.left = removeMin(node.left); return node; }
删除节点
//删除二分搜索树的节点 private Node remove(Node node, E e) { if (node == null) { return null; } if (e.compareTo(node.e) < 0) { node.left = remove(node.left,e); return node; }else if (e.compareTo(node.e) > 0) { node.right = remove(node.right,e); return node; }else{ if (node.right == null) { Node leftNode = node.left; node.left = null; size --; return leftNode; } if (node.left == null) { Node righNode = node.right; node.right = null; size--; return righNode; } Node successor = minNode(node.right); successor.right = removeMin(node.right); successor.left = node.left; node.right = node.left = null; return successor; } }