Six degrees of separation is the theory that everyone and everything is six or fewer steps away, by way of introduction, from any other person in the world, so that a chain of “a friend of a friend” statements can be made to connect any two people in a maximum of six steps.
Given a friendship relations, find the degrees of two people, return -1 if they can not been connected by friends of friends.
Example
Gien a graph:
1——2—–4
\ /
\ /
\–3–/
{1,2,3#2,1,4#3,1,4#4,2,3} and s = 1, t = 4 return 2
Gien a graph:
1 2—–4
/
/
3
{1#2,4#3,4#4,2,3} and s = 1, t = 4 return -1
这道题的degreeFromSource不仅用来记录节点到source的距离,同时也可以用来记录是否访问。因为无向图里计算某个节点到source的距离只需要访问一次,不能重复计算。
/**
* Definition for Undirected graph.
* class UndirectedGraphNode {
* int label;
* List<UndirectedGraphNode> neighbors;
* UndirectedGraphNode(int x) {
* label = x;
* neighbors = new ArrayList<UndirectedGraphNode>();
* }
* };
*/
public class Solution {
/**
* @param graph a list of Undirected graph node
* @param s, t two Undirected graph nodes
* @return an integer
*/
public int sixDegrees(List<UndirectedGraphNode> graph,
UndirectedGraphNode s,
UndirectedGraphNode t) {
// Write your code here
if (graph == null || s == t || graph.size() == 0){
return 0;
}
Map<UndirectedGraphNode, Integer> degreeFromSource = new HashMap<>();
Queue<UndirectedGraphNode> queue = new LinkedList<>();
degreeFromSource.put(s,0);
queue.offer(s);
while (!queue.isEmpty()){
UndirectedGraphNode curt = queue.poll();
for (UndirectedGraphNode nei : curt.neighbors){
if (degreeFromSource.containsKey(nei)){
continue;
}
degreeFromSource.put(nei, degreeFromSource.get(curt) + 1);
if (nei == t){
return degreeFromSource.get(curt) + 1;
}
queue.offer(nei);
}
}
return -1;
}
}
