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二叉树,和数据库的B树操作流程是一样的,例如:有如下字段
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F,C,B,H,K,I;
如果要形成二叉树的话,则,首先取第一个数据作为根节点,所以,现在是 F ,如果字段比根节点小,则保存在左子树,如果比根节点大或者等于根节点则保存在右子树,最后按左---根-----右输出所以数据。
所以,实现的关键就是在于保存的数据上是否存在大小比较功能,而String类中compareTo()有这个能力,节点类要保存两类数据,左节点,右节点
class Node
{
private String data;
private Node left;
private Node right;
public Node (String data){
this.data = data;
}
public void setLeft(Node left) {
this.left = left;
}
public void setRight(Node right){
this.right = right;
}
public String getDate() {
return this.data;
}
public Node getLeft(){
return this.left;
}
public Node getRight(){
return this.right;
}
public void addNode(Node newNode){
if(this.data点抗 pareTo(newNode.data)=0) {
if(this.left == null){
this.left = newNode;
}else {
this.left.addNode(newNode);
}
}else {
if(this.right == null) {
this.right = newNode;
} else {
this.right.addNode(newNode);
}
}
}
public void printNode(){
if(this.left!= null){
this.left.printNode();
}
System.out.println(this.data);
if(this.right != null){
this.right.printNode();
}
}
}
class BinaryTree
{
private Node root = null;
public void add(String data) {
Node newNode = new Node(data);
if(this.root == null) {
this.root = newNode;
}else{
this.root.addNode(newNode);
}
}
public void print() {
this.root.printNode();
}
}
public class Hello
{
public static void main (String args[]) {
BinaryTree link = new BinaryTree();
link.add("F");
link.add("C");
link.add("B");
link.add("H");
link.add("K");
link.add("I");
link.print();
}
}
你一看就英文就知道什么意思了,应该可以理解了
这个二叉树捉摸不透就别琢磨了,开放中一般用不上
}
二叉树
1
2 3
4 5 6 7
这个二叉树的深度是3,树的深度是最大结点所在的层,这里是3.
应该计算所有结点层数,选择最大的那个。
根据上面的二叉树代码,递归过程是:
f(1)=f(2)+1 f(3) +1 ? f(2) + 1 : f(3) +1
f(2) 跟f(3)计算类似上面,要计算左右结点,然后取大者
所以计算顺序是f(4.left) = 0, f(4.right) = 0
f(4) = f(4.right) + 1 = 1
然后计算f(5.left) = 0,f(5.right) = 0
f(5) = f(5.right) + 1 =1
f(2) = f(5) + 1 =2
f(1.left) 计算完毕,计算f(1.right) f(3) 跟计算f(2)的过程一样。
得到f(3) = f(7) +1 = 2
f(1) = f(3) + 1 =3
if(depleftdepright){
return depleft+1;
}else{
return depright+1;
}
只有left大于right的时候采取left +1,相等是取right
二叉树的相关操作,包括创建,中序、先序、后序(递归和非递归),其中重点的是java在先序创建二叉树和后序非递归遍历的的实现。
package com.algorithm.tree;
import java.io.File;
import java.io.FileNotFoundException;
import java.util.Queue;
import java.util.Scanner;
import java.util.Stack;
import java.util.concurrent.LinkedBlockingQueue;
public class Tree {
private Node root;
public Tree() {
}
public Tree(Node root) {
this.root = root;
}
//创建二叉树
public void buildTree() {
Scanner scn = null;
try {
scn = new Scanner(new File("input.txt"));
} catch (FileNotFoundException e) {
// TODO Auto-generated catch block
e.printStackTrace();
}
root = createTree(root,scn);
}
//先序遍历创建二叉树
private Node createTree(Node node,Scanner scn) {
String temp = scn.next();
if (temp.trim().equals("#")) {
return null;
} else {
node = new Node((T)temp);
node.setLeft(createTree(node.getLeft(), scn));
node.setRight(createTree(node.getRight(), scn));
return node;
}
}
//中序遍历(递归)
public void inOrderTraverse() {
inOrderTraverse(root);
}
public void inOrderTraverse(Node node) {
if (node != null) {
inOrderTraverse(node.getLeft());
System.out.println(node.getValue());
inOrderTraverse(node.getRight());
}
}
//中序遍历(非递归)
public void nrInOrderTraverse() {
StackNode stack = new StackNode();
Node node = root;
while (node != null || !stack.isEmpty()) {
while (node != null) {
stack.push(node);
node = node.getLeft();
}
node = stack.pop();
System.out.println(node.getValue());
node = node.getRight();
}
}
//先序遍历(递归)
public void preOrderTraverse() {
preOrderTraverse(root);
}
public void preOrderTraverse(Node node) {
if (node != null) {
System.out.println(node.getValue());
preOrderTraverse(node.getLeft());
preOrderTraverse(node.getRight());
}
}
//先序遍历(非递归)
public void nrPreOrderTraverse() {
StackNode stack = new StackNode();
Node node = root;
while (node != null || !stack.isEmpty()) {
while (node != null) {
System.out.println(node.getValue());
stack.push(node);
node = node.getLeft();
}
node = stack.pop();
node = node.getRight();
}
}
//后序遍历(递归)
public void postOrderTraverse() {
postOrderTraverse(root);
}
public void postOrderTraverse(Node node) {
if (node != null) {
postOrderTraverse(node.getLeft());
postOrderTraverse(node.getRight());
System.out.println(node.getValue());
}
}
//后续遍历(非递归)
public void nrPostOrderTraverse() {
StackNode stack = new StackNode();
Node node = root;
Node preNode = null;//表示最近一次访问的节点
while (node != null || !stack.isEmpty()) {
while (node != null) {
stack.push(node);
node = node.getLeft();
}
node = stack.peek();
if (node.getRight() == null || node.getRight() == preNode) {
System.out.println(node.getValue());
node = stack.pop();
preNode = node;
node = null;
} else {
node = node.getRight();
}
}
}
//按层次遍历
public void levelTraverse() {
levelTraverse(root);
}
public void levelTraverse(Node node) {
QueueNode queue = new LinkedBlockingQueueNode();
queue.add(node);
while (!queue.isEmpty()) {
Node temp = queue.poll();
if (temp != null) {
System.out.println(temp.getValue());
queue.add(temp.getLeft());
queue.add(temp.getRight());
}
}
}
}
//树的节点
class Node {
private Node left;
private Node right;
private T value;
public Node() {
}
public Node(Node left,Node right,T value) {
this.left = left;
this.right = right;
this.value = value;
}
public Node(T value) {
this(null,null,value);
}
public Node getLeft() {
return left;
}
public void setLeft(Node left) {
this.left = left;
}
public Node getRight() {
return right;
}
public void setRight(Node right) {
this.right = right;
}
public T getValue() {
return value;
}
public void setValue(T value) {
this.value = value;
}
}
测试代码:
package com.algorithm.tree;
public class TreeTest {
/**
* @param args
*/
public static void main(String[] args) {
Tree tree = new Tree();
tree.buildTree();
System.out.println("中序遍历");
tree.inOrderTraverse();
tree.nrInOrderTraverse();
System.out.println("后续遍历");
//tree.nrPostOrderTraverse();
tree.postOrderTraverse();
tree.nrPostOrderTraverse();
System.out.println("先序遍历");
tree.preOrderTraverse();
tree.nrPreOrderTraverse();
//
}
}