poj2367 Genealogical tree

Genealogical tree

Time Limit: 1000MS		Memory Limit: 65536K
Total Submissions: 2600		Accepted: 1743		Special Judge

Description

The system of Martians' blood relations is confusing enough. Actually, Martians bud when they want and where they want. They gather together in different groups, so that a Martian can have one parent as well as ten. Nobody will be surprised by a hundred of children. Martians have got used to this and their style of life seems to them natural. 
And in the Planetary Council the confusing genealogical system leads to some embarrassment. There meet the worthiest of Martians, and therefore in order to offend nobody in all of the discussions it is used first to give the floor to the old Martians, than to the younger ones and only than to the most young childless assessors. However, the maintenance of this order really is not a trivial task. Not always Martian knows all of his parents (and there's nothing to tell about his grandparents!). But if by a mistake first speak a grandson and only than his young appearing great-grandfather, this is a real scandal. 
Your task is to write a program, which would define once and for all, an order that would guarantee that every member of the Council takes the floor earlier than each of his descendants.

Input

The first line of the standard input contains an only number N, 1 <= N <= 100 — a number of members of the Martian Planetary Council. According to the centuries-old tradition members of the Council are enumerated with the natural numbers from 1 up to N. Further, there are exactly N lines, moreover, the I-th line contains a list of I-th member's children. The list of children is a sequence of serial numbers of children in a arbitrary order separated by spaces. The list of children may be empty. The list (even if it is empty) ends with 0.

Output

The standard output should contain in its only line a sequence of speakers' numbers, separated by spaces. If several sequences satisfy the conditions of the problem, you are to write to the standard output any of them. At least one such sequence always exists.

Sample Input

5
0
4 5 1 0
1 0
5 3 0
3 0

Sample Output

2 4 5 3 1

大致题意：给定一个家族图，找出一个血脉关系：（1->2->3，即1为2的父亲，2为3的父亲）。

如果某个点为所有人的父亲，那么这个点入度肯定为0，然后依次找入度为零的点，即拓扑排序。

代码：

#include 
#include 
#include 
using namespace std;

int g[102][102];
int in[102], ans[102];
int en, n;

int topsort()
{
	int i, j;
	stack s;
	for (i=1; i<=n; ++i)
	{
		if (in[i] == 0)   // 将入度为零的点加入队列
			s.push(i);
	}
	int cur;
	en = 0;
	while (!s.empty())
	{
		cur = s.top();
		s.pop();
		ans[en++] = cur;   // 保留结果
		for (i=1; i<=n; ++i)
		{
			if (g[cur][i] == 1)
			{
				--in[i];
				if (in[i] == 0)  // 将入度为零的点加入队列
				{
					s.push(i);
				}
			}
		}
	}
	printf("%d", ans[0]);
	for (i=1; i