The order of a Tree
Time Limit: 2000/1000 MS (Java/Others) Memory Limit: 32768/32768 K (Java/Others)
Total Submission(s): 835 Accepted Submission(s): 453
Problem Description
As we know,the shape of a binary search tree is greatly related to the order of keys we insert. To be precisely:
1. insert a key k to a empty tree, then the tree become a tree with
only one node;
2. insert a key k to a nonempty tree, if k is less than the root ,insert
it to the left sub-tree;else insert k to the right sub-tree.
We call the order of keys we insert “the order of a tree”,your task is,given a oder of a tree, find the order of a tree with the least lexicographic order that generate the same tree.Two trees are the same if and only if they have the same shape.
Input
There are multiple test cases in an input file. The first line of each testcase is an integer n(n <= 100,000),represent the number of nodes.The second line has n intergers,k1 to kn,represent the order of a tree.To make if more simple, k1 to kn is a sequence of 1 to n.
Output
One line with n intergers, which are the order of a tree that generate the same tree with the least lexicographic.
Sample Input
4
1 3 4 2
Sample Output
1 3 2 4
Source
2011 Multi-University Training Contest 16 - Host by TJU
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lcy
#include<iostream>
#include<cstdio>
#include<cstring>
#include<stack>
#include<cstdlib>
using namespace std;
const int N=1010;
struct Tree{
Tree *l,*r;
int x;
}tree;
Tree *root;
Tree *Create(Tree *rt,int x){
if(rt==NULL){
rt=(Tree *)malloc(sizeof(Tree));
rt->x=x;
rt->l=rt->r=NULL;
return rt;
}
if(rt->x>x) //insert a key k to a nonempty tree, if k is less than the root ,insert it to the left sub-tree
rt->l=Create(rt->l,x);
else //else insert k to the right sub-tree
rt->r=Create(rt->r,x);
return rt;
}
void PreOrder(Tree *rt,int x){ //先序历遍
if(x==1)
printf("%d",rt->x);
else
printf(" %d",rt->x);
if(rt->l!=NULL)
PreOrder(rt->l,2);
if(rt->r!=NULL)
PreOrder(rt->r,2);
}
int main(){
//freopen("input.txt","r",stdin);
int n,x;
while(~scanf("%d",&n)){
root=NULL;
for(int i=0;i<n;i++){
scanf("%d",&x);
root=Create(root,x);
}
PreOrder(root,1);
printf("\n");
}
return 0;
}