poj 1577 Falling Leaves

Falling Leaves
Time Limit: 1000MS   Memory Limit: 10000K
Total Submissions: 4229   Accepted: 2338

Description

 
Figure 1

Figure 1 shows a graphical representation of a binary tree of letters. People familiar with binary trees can skip over the definitions of a binary tree of letters, leaves of a binary tree, and a binary search tree of letters, and go right to The problem. 

A binary tree of letters may be one of two things: 
  1. It may be empty. 
  2. It may have a root node. A node has a letter as data and refers to a left and a right subtree. The left and right subtrees are also binary trees of letters.

In the graphical representation of a binary tree of letters: 
  1. Empty trees are omitted completely. 
  2. Each node is indicated by 
    • Its letter data, 
    • A line segment down to the left to the left subtree, if the left subtree is nonempty, 
    • A line segment down to the right to the right subtree, if the right subtree is nonempty.

A leaf in a binary tree is a node whose subtrees are both empty. In the example in Figure 1, this would be the five nodes with data B, D, H, P, and Y. 

The preorder traversal of a tree of letters satisfies the defining properties: 
  1. If the tree is empty, then the preorder traversal is empty. 
  2. If the tree is not empty, then the preorder traversal consists of the following, in order 
    • The data from the root node, 
    • The preorder traversal of the root's left subtree, 
    • The preorder traversal of the root's right subtree.

The preorder traversal of the tree in Figure 1 is KGCBDHQMPY. 

A tree like the one in Figure 1 is also a binary search tree of letters. A binary search tree of letters is a binary tree of letters in which each node satisfies: 

The root's data comes later in the alphabet than all the data in the nodes in the left subtree. 

The root's data comes earlier in the alphabet than all the data in the nodes in the right subtree. 

The problem: 

Consider the following sequence of operations on a binary search tree of letters 

Remove the leaves and list the data removed 
Repeat this procedure until the tree is empty 
Starting from the tree below on the left, we produce the sequence of trees shown, and then the empty tree 

by removing the leaves with data 

BDHPY 
CM 
GQ 


Your problem is to start with such a sequence of lines of leaves from a binary search tree of letters and output the preorder traversal of the tree.

Input

The input will contain one or more data sets. Each data set is a sequence of one or more lines of capital letters. 

The lines contain the leaves removed from a binary search tree in the stages described above. The letters on a line will be listed in increasing alphabetical order. Data sets are separated by a line containing only an asterisk ('*'). 

The last data set is followed by a line containing only a dollar sign ('$'). There are no blanks or empty lines in the input.

Output

For each input data set, there is a unique binary search tree that would produce the sequence of leaves. The output is a line containing only the preorder traversal of that tree, with no blanks.

Sample Input

BDHPY
CM
GQ
K
*
AC
B
$

Sample Output

KGCBDHQMPY
BAC

Source

 

注意一下,相邻测试用例和结束的标识符,其实就是一个用例的输入结束符。

 1 #include <cstdio>
 2 #include <cstring>
 3 #include <string>
 4 #include <queue>
 5 #include <stack>
 6 #include <iostream>
 7 using namespace std;
 8 struct node{
 9     node *l,*r;
10     char c;
11 };
12 void preview(node *p){
13     if(!p)
14         return;
15     cout<<p->c;
16     preview(p->l);
17     preview(p->r);
18 }
19 char tree[30][30];
20 int main(){
21     //freopen("D:\\INPUT.txt","r",stdin);
22     int n;
23     while(scanf("%s",tree[0])!=EOF){
24         int i;
25         for(i=1;;i++){
26             scanf("%s",tree[i]);
27             //cout<<tree[i]<<endl;
28             if(!strcmp(tree[i],"*")||!strcmp(tree[i],"$"))  //注意结束符号,要写在这里
29                 break;
30         }
31         i--;
32         node *head=new node();//头结点
33         head->c=tree[i--][0];
34         head->l=head->r=NULL;
35         while(i>=0){//构建二叉树
36             int j=0;
37             for(;j<strlen(tree[i]);j++){
38                 char c=tree[i][j];
39                 node *p=head;
40                 node *q=p;
41                 while(p){
42                     q=p;
43                     if(c>p->c){
44                         p=p->r;
45                     }
46                     else{
47                         p=p->l;
48                     }
49                 }
50                 p=new node();
51                 p->c=c;
52                 p->l=p->r=NULL;
53                 if(c>q->c){
54                     q->r=p;
55                     //cout<<c<<endl;
56                     }
57                 else{
58                     q->l=p;
59                     //cout<<c<<endl;
60                     }
61             }
62             i--;
63         }
64         preview(head);//先序遍历
65         printf("\n");
66     }
67     return 0;
68 }

 

posted @ 2015-07-15 08:13  Deribs4  阅读(318)  评论(0编辑  收藏  举报