In computer science, a heap is a specialized tree-based data structure that satisfies the heap property: if P is a parent node of C, then the key (the value) of P is either greater than or equal to (in a max heap) or less than or equal to (in a min heap) the key of C. A common implementation of a heap is the binary heap, in which the tree is a complete binary tree. (Quoted from Wikipedia at https://en.wikipedia.org/wiki/Heap_(data_structure))
One thing for sure is that all the keys along any path from the root to a leaf in a max/min heap must be in non-increasing/non-decreasing order.
Your job is to check every path in a given complete binary tree, in order to tell if it is a heap or not.
Input Specification:
Each input file contains one test case. For each case, the first line gives a positive integer N (1<N≤1,000), the number of keys in the tree. Then the next line contains N distinct integer keys (all in the range of int), which gives the level order traversal sequence of a complete binary tree.
Output Specification:
For each given tree, first print all the paths from the root to the leaves. Each path occupies a line, with all the numbers separated by a space, and no extra space at the beginning or the end of the line. The paths must be printed in the following order: for each node in the tree, all the paths in its right subtree must be printed before those in its left subtree.
Finally print in a line Max Heap if it is a max heap, or Min Heap for a min heap, or Not Heap if it is not a heap at all.
Sample Input 1:
8
98 72 86 60 65 12 23 50
Sample Output 1:
98 86 23
98 86 12
98 72 65
98 72 60 50
Max Heap
Sample Input 2:
8
8 38 25 58 52 82 70 60
Sample Output 2:
8 25 70
8 25 82
8 38 52
8 38 58 60
Min Heap
Sample Input 3:
8
10 28 15 12 34 9 8 56
Sample Output 3:
10 15 8
10 15 9
10 28 34
10 28 12 56
Not Heap
#include <stdio.h> #include <algorithm> #include <set> #include <vector> #include <string> #include <iostream> #include <queue> using namespace std; const int maxn=2001; int tree[maxn] ; int n; vector<int> v; void dfs(int st){ v.push_back(tree[st]); if(st*2>n){ if(st<=n){ for(int i=0;i<v.size();i++){ printf("%d%s",v[i],i!=v.size()-1?" ":" "); } } } else{ //v.push_back(tree[st*2+1]); dfs(st*2+1); //v.pop_back(); //v.push_back(tree[st*2]); dfs(st*2); } v.pop_back(); } int main(){ scanf("%d",&n); int ismax=1,ismin=1; for(int i=1;i<=n;i++){ scanf("%d",&tree[i]); } dfs(1); for(int i=2;i<=n;i++){ if(tree[i/2]>tree[i])ismin=0; if(tree[i/2]<tree[i])ismax=0; } if(ismin==1)printf("Min Heap "); else{ printf("%s ",ismax==1?"Max Heap":"Not Heap"); } }
注意点:完全二叉树可以直接用数组存储,根节点下标为1,左子节点为2*root,右子节点2*root+1,当当前节点的左子节点编号大于n时,该节点即为叶节点。当节点下标大于n时,这个节点为空节点。
路径遍历用dfs实现,用一个vector控制路径上的值,每递归一次记得弹出