爱站程序员基地1099 Build A Binary Search Tree
A Binary Search Tree (BST) is recursively defined as a binary tree which has the following properties:
The left subtree of a node contains only nodes with keys less than the node’s key.
The right subtree of a node contains only nodes with keys greater than or equal to the node’s key.
Both the left and right subtrees must also be binary search trees.
Given the structure of a binary tree and a sequence of distinct integer keys, there is only one way to fill these keys into the tree so that the resulting tree satisfies the definition of a BST. You are supposed to output the level order traversal sequence of that tree. The sample is illustrated by Figure 1 and 2.
图略
Input Specification:
Each input file contains one test case. For each case, the first line gives a positive integer N (≤100) which is the total number of nodes in the tree. The next N lines each contains the left and the right children of a node in the format left_index right_index, provided that the nodes are numbered from 0 to N−1, and 0 is always the root. If one child is missing, then −1 will represent the NULL child pointer. Finally N distinct integer keys are given in the last line.
Output Specification:
For each test case, print in one line the level order traversal sequence of that tree. All the numbers must be separated by a space, with no extra space at the end of the line.
Sample Input:
91 62 3-1 -1-1 45 -1-1 -17 -1-1 8-1 -173 45 11 58 82 25 67 38 42
Sample Output:
58 25 82 11 38 67 45 73 42
先根据给出的编号确定树的结构,每个结点插入的值都要满足搜索树的性质,可以先对序列排序,然后中序插入遍历插入结点值,最后层序遍历输出即可。
#include<bits/stdc++.h>using namespace std;struct node{int data,lchild,rchild;}T[10005];int num[1010],l=0,ok=0;void build(int root){if(root==-1)return;build(T[root].lchild);T[root].data=num[l++];build(T[root].rchild);}void bfs(int root){queue<int>q;q.push(root);while(!q.empty()){int i=q.front();q.pop();if(ok++)cout<<\' \';cout<<T[i].data;if(T[i].lchild!=-1)q.push(T[i].lchild);if(T[i].rchild!=-1)q.push(T[i].rchild);}}int main(){int N;cin>>N;for(int i=0;i<N;i++)cin>>T[i].lchild>>T[i].rchild;for(int i=0;i<N;i++)cin>>num[i];sort(num,num+N);build(0);bfs(0);return 0;}
