java中二叉树全代码 java二叉树有什么作用-成都快上网建站

java中二叉树全代码 java二叉树有什么作用

二叉树的遍历的完整代码是什么

二叉树遍历代码

成都创新互联公司是专业的榆社网站建设公司,榆社接单;提供网站制作、做网站,网页设计,网站设计,建网站,PHP网站建设等专业做网站服务;采用PHP框架,可快速的进行榆社网站开发网页制作和功能扩展;专业做搜索引擎喜爱的网站,专业的做网站团队,希望更多企业前来合作!

#include"iostream.h"

#include"stdlib.h"

#include"stdio.h"

#includestack

using namespace std;

#define NULL 0

#define OK 1

#define OVERFLOW -1

typedef int Status;

typedef struct node

{

char data;

struct node *lchild;

struct node *rchild;

}*bitree;

int k=0;

int depth(bitree T)//树的高度

{

if(!T)return 0;

else

{

int m=depth(T-lchild); int n=depth(T-rchild); return (mn?m:n)+1;

}

}

//先序,中序 建树

struct node *create(char *pre,char *ord,int n) {

struct node * T;

int m;

T=NULL;

if(n=0)

{

return NULL;

}

else

{

m=0;

T=new(struct node);

T-data=*pre;

T-lchild=T-rchild=NULL; while(ord[m]!=*pre)

m++;

T-lchild=create(pre+1,ord,m);

T-rchild=create (pre+m+1,ord+m+1,n-m-1); return T;

}

}

//中序递归遍历

void inorder(struct node *T)

{

if(!T)

return;

else

{

inorder(T-lchild );

coutT-data;

inorder(T-rchild );

}

}

void inpre(struct node *T)

{

if(!T)

return;

else

{

coutT-data;

inpre(T-lchild );

inpre(T-rchild );

}

}

void postorder(struct node *T)

{

if(!T)

return;

else

{

postorder (T-lchild );

postorder (T-rchild );

coutT-data;

}

}

//先序非递归遍历

void inpre1(struct node *T)

第2/4页

{

struct node *p;

struct node *stack[20];

int top=0;

p=T;

cout"非递归先序为:"endl;

while(p||top!=0)

{

while (p)

{

stack[top++]=p;

coutp-data;

p=p-lchild;

}

p=stack[--top];

p=p-rchild ;

}

}

//中序非递归遍历

void inorder1(struct node *T)

{

struct node *p;

struct node *stack[20];

int top=0;

p=T;

cout"非递归中序为:"endl;

while(p||top!=0)

{

while (p)

{

stack[top++]=p;

p=p-lchild ;

}

p=stack[--top];

coutp-data;

p=p-rchild ;

}

}

//主函数

int main()

{

bitree T;

char pre[30],ord[30];

第3/4页

int n,m;

cout"请输入先序为-+a*b%cd/ef的二叉树:"endl; gets(pre);

cout"请输入中序为a+b*c%d-e/f的二叉树:"endl; gets(ord);

n=strlen(pre);

T=create(pre,ord,n);

cout "后序遍历为:"endl;

postorder (T);

coutendl;

inpre1(T);

coutendl;

inorder1(T);

coutendl;

m=depth(T);

cout"二叉树高度为:"mendl;

return 0;

}

java 由字符串构成的二叉树

java构造二叉树,可以通过链表来构造,如下代码:

public class BinTree {public final static int MAX=40;BinTree []elements = new BinTree[MAX];//层次遍历时保存各个节点 int front;//层次遍历时队首 int rear;//层次遍历时队尾private Object data; //数据元数private BinTree left,right; //指向左,右孩子结点的链public BinTree(){}public BinTree(Object data){ //构造有值结点 this.data = data; left = right = null;}public BinTree(Object data,BinTree left,BinTree right){ //构造有值结点 this.data = data; this.left = left; this.right = right;}public String toString(){ return data.toString();}//前序遍历二叉树public static void preOrder(BinTree parent){ if(parent == null) return; System.out.print(parent.data+" "); preOrder(parent.left); preOrder(parent.right);}//中序遍历二叉树public void inOrder(BinTree parent){ if(parent == null) return; inOrder(parent.left); System.out.print(parent.data+" "); inOrder(parent.right);}//后序遍历二叉树public void postOrder(BinTree parent){ if(parent == null) return; postOrder(parent.left); postOrder(parent.right); System.out.print(parent.data+" ");}// 层次遍历二叉树 public void LayerOrder(BinTree parent){ elements[0]=parent; front=0;rear=1; while(frontrear) { try { if(elements[front].data!=null) { System.out.print(elements[front].data + " "); if(elements[front].left!=null) elements[rear++]=elements[front].left; if(elements[front].right!=null) elements[rear++]=elements[front].right; front++; } }catch(Exception e){break;} }}//返回树的叶节点个数public int leaves(){ if(this == null) return 0; if(left == nullright == null) return 1; return (left == null ? 0 : left.leaves())+(right == null ? 0 : right.leaves());}//结果返回树的高度public int height(){ int heightOfTree; if(this == null) return -1; int leftHeight = (left == null ? 0 : left.height()); int rightHeight = (right == null ? 0 : right.height()); heightOfTree = leftHeightrightHeight?rightHeight:leftHeight; return 1 + heightOfTree;}//如果对象不在树中,结果返回-1;否则结果返回该对象在树中所处的层次,规定根节点为第一层public int level(Object object){ int levelInTree; if(this == null) return -1; if(object == data) return 1;//规定根节点为第一层 int leftLevel = (left == null?-1:left.level(object)); int rightLevel = (right == null?-1:right.level(object)); if(leftLevel0rightLevel0) return -1; levelInTree = leftLevelrightLevel?rightLevel:leftLevel; return 1+levelInTree; }//将树中的每个节点的孩子对换位置public void reflect(){ if(this == null) return; if(left != null) left.reflect(); if(right != null) right.reflect(); BinTree temp = left; left = right; right = temp;}// 将树中的所有节点移走,并输出移走的节点public void defoliate(){ if(this == null) return; //若本节点是叶节点,则将其移走 if(left==nullright == null) { System.out.print(this + " "); data = null; return; } //移走左子树若其存在 if(left!=null){ left.defoliate(); left = null; } //移走本节点,放在中间表示中跟移走... String innerNode += this + " "; data = null; //移走右子树若其存在 if(right!=null){ right.defoliate(); right = null; }} /*** @param args*/public static void main(String[] args) { // TODO Auto-generated method stub BinTree e = new BinTree("E"); BinTree g = new BinTree("G"); BinTree h = new BinTree("H"); BinTree i = new BinTree("I"); BinTree d = new BinTree("D",null,g); BinTree f = new BinTree("F",h,i); BinTree b = new BinTree("B",d,e); BinTree c = new BinTree("C",f,null); BinTree tree = new BinTree("A",b,c); System.out.println("前序遍历二叉树结果: "); tree.preOrder(tree); System.out.println(); System.out.println("中序遍历二叉树结果: "); tree.inOrder(tree); System.out.println(); System.out.println("后序遍历二叉树结果: "); tree.postOrder(tree); System.out.println(); System.out.println("层次遍历二叉树结果: "); tree.LayerOrder(tree); System.out.println(); System.out.println("F所在的层次: "+tree.level("F")); System.out.println("这棵二叉树的高度: "+tree.height()); System.out.println("--------------------------------------"); tree.reflect(); System.out.println("交换每个节点的孩子节点后......"); System.out.println("前序遍历二叉树结果: "); tree.preOrder(tree); System.out.println(); System.out.println("中序遍历二叉树结果: "); tree.inOrder(tree); System.out.println(); System.out.println("后序遍历二叉树结果: "); tree.postOrder(tree); System.out.println(); System.out.println("层次遍历二叉树结果: "); tree.LayerOrder(tree); System.out.println(); System.out.println("F所在的层次: "+tree.level("F")); System.out.println("这棵二叉树的高度: "+tree.height());

用java怎么构造一个二叉树?

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();

//

}

}


当前名称:java中二叉树全代码 java二叉树有什么作用
URL网址:http://kswjz.com/article/ddegoso.html
扫二维码与项目经理沟通

我们在微信上24小时期待你的声音

解答本文疑问/技术咨询/运营咨询/技术建议/互联网交流