二叉树

最新推荐文章于 2024-07-29 08:47:18 发布
Lasser-L
最新推荐文章于 2024-07-29 08:47:18 发布
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分类专栏：数据结构与算法文章标签：二叉树基本操作及面试题
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#include <stdio.h>
#include <stdlib.h>
#include "btree.h"
#include "queue.h"
#include "stack.h"
 
 
int main() {
 
//完全二叉树
//BTDataType* str = "123###4##56";
 
//不是完全二叉树
BTDataType* str = "123###56";
 
PBTNode pRoot = NULL;
int index = 0;
CreateBinTree(&pRoot, str, strlen(str));
 
 
 
printf("先序遍历：\n");
PreOrder(pRoot);
printf("\n");
 
printf("循环先序遍历：\n");
PreOrderNor(pRoot);
printf("\n\n");
 
 
printf("中序遍历：\n");
InOrder(pRoot);
printf("\n");
 
 
printf("循环中序遍历：\n");
InOrderNor(pRoot);
printf("\n\n");
 
 
printf("后序遍历：\n");
PostOrder(pRoot);
printf("\n");
 
printf("循环后序遍历：\n");
PostOrderNor(pRoot);
printf("\n\n");
 
int size = BinTreeSize(pRoot);
printf("二叉树节点个数为%d\n", size);
 
int high = BinTreeHeight(pRoot);
printf("高度为%d\n", high);
 
int leafCount = BinTreeLeaf(pRoot);
printf("叶子节点个数为%d\n", leafCount);
 
int K = 2;
int KSize = BinTreeKLevelNode(pRoot, K);
printf("第%d层节点个数为%d\n\n", K, KSize);
 
char c = '1';
PBTNode node = Find(pRoot, c);
if (node != NULL)
printf("找到了%c \n\n", node->data);
else
printf("没有%c这个节点！\n\n", c);
 
 
if (IsNodeInBinTree(pRoot, node))
printf("节点%c在二叉树中\n\n", node->data);
else
printf("节点%c不在二叉树中\n\n", c);
 
if (IsCompleteBinTree(pRoot))
printf("是完全二叉树！\n");
else
printf("不是完全二叉树！\n");
 
printf("层序遍历：");
LevelOrder(pRoot);
printf("\n\n");
 
MirrorBinTreeNor(pRoot);
printf("循环二叉树镜像之后层序遍历：\n");
LevelOrder(pRoot);
printf("\n\n");
 
MirrorBinTree(pRoot);
printf("递归二叉树镜像之后层序遍历：\n");
LevelOrder(pRoot);
printf("\n\n");
 
printf("先序遍历：\n");
PreOrder(pRoot);
printf("\n");
PBTNode newRoot = NULL;
CopyBinTree(pRoot, &newRoot);
printf("拷贝二叉树之后先序遍历：\n");
PreOrder(newRoot);
printf("\n\n");
 
printf("删除二叉树之后的先序遍历：\n");
DetroyBinTree(&pRoot);
PreOrder(pRoot);
return 0;
}
 
// 二叉树创建 
void CreateBinTree(PBTNode* pRoot, BTDataType array[], int size) {
int index = 0;
BTNodeCreate(array, pRoot, size, &index, '#');
}
 
void BTNodeCreate(BTDataType* array, PBTNode* pRoot, int length, int *index, BTDataType invalid) {
if (*index < length && array[*index] != invalid) {
*pRoot = (PBTNode)malloc(sizeof(BTNode));
 
if (*pRoot == NULL)
return;
(*pRoot)->LChild = NULL;
(*pRoot)->RChild = NULL;
(*pRoot)->data = array[*index];
 
++(*index);
BTNodeCreate(array, &(*pRoot)->LChild, length, index, invalid);
++(*index);
BTNodeCreate(array, &(*pRoot)->RChild, length, index, invalid);
}
}
void PreOrder(PBTNode pRoot) {
if (pRoot) {
printf("%c ", pRoot->data);
PreOrder(pRoot->LChild);
PreOrder(pRoot->RChild);
}
}
void InOrder(PBTNode pRoot) {
if (pRoot) {
InOrder(pRoot->LChild);
printf("%c ", pRoot->data);
InOrder(pRoot->RChild);
}
}
void PostOrder(PBTNode pRoot) {
if (pRoot) {
PostOrder(pRoot->LChild);
PostOrder(pRoot->RChild);
printf("%c ", pRoot->data);
}
}
 
void DetroyBinTree(PBTNode* pRoot) {
if (*pRoot) {
 
DetroyBinTree(&(*pRoot)->LChild);
DetroyBinTree(&(*pRoot)->RChild);
free(*pRoot);
*pRoot = NULL;
}
}
 
void CopyBinTree(PBTNode pRoot, PBTNode* newRoot) {
if (pRoot) {
*newRoot = (PBTNode)malloc(sizeof(BTNode));
if (*newRoot == NULL)
return;
(*newRoot)->LChild = NULL;
(*newRoot)->RChild = NULL;
 
(*newRoot)->data = pRoot->data;
 
CopyBinTree(pRoot->LChild, &(*newRoot)->LChild);
CopyBinTree(pRoot->RChild, &(*newRoot)->RChild);
}
}
 
// 循环先序遍历二叉树
void PreOrderNor(PBTNode pRoot) {
if (pRoot == NULL)
return;
PBTNode cur = pRoot;
Stack s;
StackInit(&s);
while (1) {
printf("%c ", cur->data);
if (cur->RChild != NULL)
StackPush(&s, cur->RChild);
cur = cur->LChild;
if (cur == NULL) {
int ret = StackPop(&s, &cur);
if (ret == 0)
return;
}
}
}
 
//循环中序遍历二叉树
void InOrderNor(PBTNode pRoot) {
if (pRoot == NULL)
return;
PBTNode cur = pRoot;
PBTNode tmp = NULL;
Stack s;
StackInit(&s);
while (1) {
 
while (cur != NULL) {
StackPush(&s, cur);
cur = cur->LChild;
}
 
// ret表示pop的状态，0表示空栈
int ret = StackPop(&s, &tmp);
if (!ret)
return;
 
printf("%c ", tmp->data);
if (tmp->RChild)
cur = tmp->RChild;
 
}
 
}
 
//循环后续遍历二叉树
void PostOrderNor(PBTNode pRoot) {
if (pRoot == NULL)
return;
Stack s;
StackInit(&s);
 
PBTNode cur = pRoot;
 
// 当前节点
PBTNode tmp = NULL;
 
// 用来记录上一次出栈的节点，以便判断这个节点是否应该继续向下遍历
PBTNode preTmp = NULL;
 
//放入根节点
StackPush(&s, cur);
 
while (1) {
 
// 一直向左，入栈顺序为，cur cur->RChild  cur->LChild
while (cur != NULL)
{
if (cur->RChild)
StackPush(&s, cur->RChild);
if (cur->LChild)
StackPush(&s, cur->LChild);
cur = cur->LChild;
}
if (cur == NULL) {
 
tmp = StackTop(&s);
 
//栈为空退出
if (tmp == NULL)
return;
 
//判断当前点的子节点是否是上一次遍历的。如果是则代表这颗树的子节点已经遍历完了，就直接输出当前节点
if (tmp->LChild == preTmp || tmp->RChild == preTmp) {
printf("%c ", tmp->data);
StackPop(&s, &tmp);
preTmp = tmp;
continue;
}
 
// 不直接遍历则看他的左右孩子是否为空，不为空就入栈
if (tmp->LChild || tmp->RChild) {
cur = tmp;
preTmp = tmp;
continue;
}
 
//叶子节点，直接打印。
StackPop(&s, &tmp);
preTmp = tmp;
printf("%c ", tmp->data);
 
}
}
}
 
//// array1为先序，array2为中序
//void RebuildBTNode(PBTNode* pRoot, BTDataType* array1, BTDataType* array2, int length) {
//	int i = 0; 
//	int j = 0;
//
//	if (array1[i] == array2[j])
//		return;
//}
 
// 层序遍历二叉树
void LevelOrder(PBTNode pRoot) {
Queue* q = (Queue*)malloc(sizeof(Queue));
QueueInit(q);
QueuePush(q, pRoot);
PBTNode tmp = NULL;
while (!QueueEmpty(q)) {
PBTNode cur = QueueFront(q);
 
printf("%c ", cur->data);
if (cur->LChild != NULL)
QueuePush(q, cur->LChild);
if (cur->RChild != NULL)
QueuePush(q, cur->RChild);
QueuePop(q, &tmp);
}
}
 
 
// 二叉树的镜像---非递归 
void MirrorBinTreeNor(PBTNode pRoot) {
Queue* q = (Queue*)malloc(sizeof(Queue));
QueueInit(q);
QueuePush(q, pRoot);
PBTNode tmp = NULL;
while (!QueueEmpty(q)) {
PBTNode cur = QueueFront(q);
 
if (cur->LChild != NULL)
QueuePush(q, cur->LChild);
if (cur->RChild != NULL)
QueuePush(q, cur->RChild);
swapBTNodeNode(&(cur->LChild), &(cur->RChild));
QueuePop(q, &tmp);
}
}
 
// 二叉树的镜像---递归 
void MirrorBinTree(PBTNode pRoot) {
if (pRoot) {
swapBTNodeNode(&(pRoot->LChild), &(pRoot->RChild));
MirrorBinTree(pRoot->LChild);
MirrorBinTree(pRoot->RChild);
}
}
 
// 求二叉树中结点的个数 
int BinTreeSize(PBTNode pRoot) {
if (pRoot == NULL)
return 0;
if (pRoot->LChild == NULL && pRoot->RChild == NULL)
return 1;
return BinTreeSize(pRoot->LChild) + BinTreeSize(pRoot->RChild) + 1;
}
 
// 求二叉树中叶子结点的个数 
int BinTreeLeaf(PBTNode pRoot) {
if (pRoot == NULL)
return 0;
if (pRoot->LChild == NULL && pRoot->RChild == NULL)
return 1;
return BinTreeLeaf(pRoot->LChild) + BinTreeLeaf(pRoot->RChild);
}
 
 
// 求二叉树中第K层结点的个数 
int BinTreeKLevelNode(PBTNode pRoot, int K) {
if (K <= 0)
return 0;
if (K == 1 && pRoot != NULL)
return 1;
if (pRoot == NULL)
return 0;
return BinTreeKLevelNode(pRoot->LChild, K - 1) + BinTreeKLevelNode(pRoot->RChild, K - 1);
}
 
// 求二叉树的高度 
int BinTreeHeight(PBTNode pRoot) {
int leftHigh, rightHigh;
if (pRoot == NULL)
return 0;
if (pRoot->LChild == NULL && pRoot->RChild == NULL)
return 1;
leftHigh = BinTreeHeight(pRoot->LChild);
rightHigh = BinTreeHeight(pRoot->RChild);
return leftHigh > rightHigh ? leftHigh + 1 : rightHigh + 1;
}
 
// 在二叉树中查找值为data的结点，找到返回该结点，否则返回空 
PBTNode Find(PBTNode pRoot, BTDataType data) {
PBTNode node;
if (pRoot == NULL)
return NULL;
if (pRoot->data == data)
return pRoot;
node = Find(pRoot->LChild, data);
if (node == NULL) {
// 没找到就找右子树
Find(pRoot->RChild, data);
}
}
 
// 检测一个节点是否在二叉树中 
int IsNodeInBinTree(PBTNode pRoot, PBTNode pNode) {
PBTNode node;
if (pNode == NULL)
return 0;
if (pRoot == NULL)
return 0;
if (pRoot == pNode)
return 1;
node = IsNodeInBinTree(pRoot->LChild, pNode);
if (node == NULL) {
// 没找到就找右子树
IsNodeInBinTree(pRoot->RChild, pNode);
}
}
// 检测一棵树是否为完全二叉树 
int IsCompleteBinTree(PBTNode pRoot) {
if (pRoot == NULL)
return 0;
// 标识是否找到了这个特殊的节点。
int flag = 0;
PBTNode cur;
Queue q;
QueueInit(&q);
QueuePush(&q, pRoot);
while (!QueueEmpty(&q)) {
QueuePop(&q, &cur);
if (flag == 1 && (cur->LChild != NULL || cur->RChild != NULL))
return 0;
if (cur->LChild != NULL && cur->RChild != NULL && flag == 0) {
QueuePush(&q, cur->LChild);
QueuePush(&q, cur->RChild);
}
if (cur->LChild == NULL && cur->RChild != NULL)
return 0;
if ((cur->RChild == NULL && cur->LChild == NULL) ||
(cur->RChild == NULL && cur->LChild != NULL))
{
// 找到分界点。
flag = 1;
}
}
return 1;
}
 
 
//交换两个节点
void swapBTNodeNode(PBTNode* node1, PBTNode* node2) {
PBTNode tmp = *node1;
*node1 = *node2;
*node2 = tmp;
}