The Unique MST
| Time Limit: 1000MS | Memory Limit: 10000K | |
| Total Submissions: 23180 | Accepted: 8235 |
Description
Given a connected undirected graph, tell if its minimum spanning tree is unique.
Definition 1 (Spanning Tree): Consider a connected, undirected graph G = (V, E). A spanning tree of G is a subgraph of G, say T = (V', E'), with the following properties:
1. V' = V.
2. T is connected and acyclic.
Definition 2 (Minimum Spanning Tree): Consider an edge-weighted, connected, undirected graph G = (V, E). The minimum spanning tree T = (V, E') of G is the spanning tree that has the smallest total cost. The total cost of T means the sum of the weights on all the edges in E'.
Definition 1 (Spanning Tree): Consider a connected, undirected graph G = (V, E). A spanning tree of G is a subgraph of G, say T = (V', E'), with the following properties:
1. V' = V.
2. T is connected and acyclic.
Definition 2 (Minimum Spanning Tree): Consider an edge-weighted, connected, undirected graph G = (V, E). The minimum spanning tree T = (V, E') of G is the spanning tree that has the smallest total cost. The total cost of T means the sum of the weights on all the edges in E'.
Input
The first line contains a single integer t (1 <= t <= 20), the number of test cases. Each case represents a graph. It begins with a line containing two integers n and m (1 <= n <= 100), the number of nodes and edges. Each of the following m lines contains a
triple (xi, yi, wi), indicating that xi and yi are connected by an edge with weight = wi. For any two nodes, there is at most one edge connecting them.
Output
For each input, if the MST is unique, print the total cost of it, or otherwise print the string 'Not Unique!'.
Sample Input
2 3 3 1 2 1 2 3 2 3 1 3 4 4 1 2 2 2 3 2 3 4 2 4 1 2
Sample Output
3 Not Unique!
Source
对于最小生成树(能够用kruskal和prime算法求得,在这里我是用kruskal求得,假设不会请自己百度。),边的权值的和最小称为最小生成树。
而次小生成树就是除了最小生成树外的最小生成树。并且全部的次小生成树都是通过最小生成树的换边得到的。
所以难点就是怎样换边。
对于怎样换边:
1.先求出最小生成树,值为x。
2.一一枚举加入不在生成树上的边(这时候一定形成了一个环)
3.寻找环上的(最小生成树上的边)权值最大值与你所加入不在生成树上的边的权值比較,所得到的差值为min。
因为是一一枚举加入边,min有多个,求出最小的哪一个,所以次小生成树就为x+min。
昨天尽管把这道题A了,但是看到讨论区的測试数据发现自己又一个没有过,然而却AC了。然后今天起床就来研究研究。
。
。
发现我的程序是在找最大值。但是假设一个环有分支,它还会去找分支里面的最大值。于是就又优化了一下。
用的优先队列。
先附上第一次做的代码:
#include <stdio.h>
#include <string.h>
#include <algorithm>
using namespace std;
struct node
{
int a,b,cost;
}c[10005];
int fa[105],tree[105][105],vis[10005],vis_tree[105];//vis数组是对m对数据的标记vis_tree是对最小生成树标记
int n,m,max1;
bool cmp(node x,node y)
{
if(x.cost<y.cost)
return true;
else
return false;
}
int find(int x)//寻找根
{
if(fa[x]!=x) fa[x]=find(fa[x]);
return fa[x];
}
void sec_tree(int a,int b)//查找生成树某条边的最大值(我在这里做的是错误的。假设形成的环有分支,也会查找)
{
vis_tree[a]=1;
if(a==b)
return ;
for(int i=1;i<=n;i++)
if(tree[a][i]&&!vis_tree[i])
{
if(max1<tree[a][i])
max1=tree[a][i];
sec_tree(i,b);
}
}
int main()
{
int ncase;
scanf("%d",&ncase);
while(ncase--)
{
memset(vis,0,sizeof(vis));
memset(tree,0,sizeof(tree));
memset(&c,0,sizeof(&c));
scanf("%d %d",&n,&m);
for(int i=1;i<=n;i++)
fa[i]=i;
for(int i=0;i<m;i++)
scanf("%d %d %d",&c[i].a,&c[i].b,&c[i].cost);
sort(c,c+m,cmp);
int sum=0;
for(int i=0;i<m;i++)//kruskal算法求最小生成树
{
int x=find(c[i].a);
int y=find(c[i].b);
if(x!=y)
{
fa[x]=y,sum+=c[i].cost;
tree[x][y]=tree[y][x]=c[i].cost;
vis[i]=1;
}
}
int flag=0;
for(int i=0;i<m;i++)
{
if(!vis[i])//不在生成树中的边和形成的环的最大值比較。假设相等,MST不唯一
{
max1=-1;
memset(vis_tree,0,sizeof(vis_tree));
sec_tree(c[i].a,c[i].b);
if(max1==c[i].cost)
{
flag=1;
break;
}
}
}
if(!flag)
printf("%d
",sum);
else
printf("Not Unique!
");
}
}
这是优化后的代码。凝视和上面一样。就一个地方不同:
#include <stdio.h>
#include <string.h>
#include <algorithm>
#include <queue>
using namespace std;
struct node1
{
int a,b,cost;
friend bool operator<(node1 x,node1 y )
{
return x.cost<y.cost;
}
};
priority_queue<node1>s;
struct node
{
int a,b,cost;
}c[10005];
int fa[105],tree[105][105],vis[10005],vis_tree[105];
int n,m,max1,flag1;
bool cmp1(node x,node y)
{
if(x.cost<y.cost)
return true;
else
return false;
}
int find(int x)
{
if(fa[x]!=x) fa[x]=find(fa[x]);
return fa[x];
}
void sec_tree(int a,int b)
{
node1 temp;
vis_tree[a]=1;
if(a==b)//假设找到a=b,标记一下
{
flag1=1;
}
for(int i=1;i<=n;i++)
if(tree[a][i]&&!vis_tree[i])
{
temp.a=a,temp.b=i,temp.cost=tree[a][i];
s.push(temp);
if(!flag1)//就是在这里和上面不同,假设找不到a=b,那么就把曾经的恢复
s.pop(),vis_tree[i]=0,sec_tree(i,b);
}
}
int main()
{
int ncase;
scanf("%d",&ncase);
while(ncase--)
{
memset(vis,0,sizeof(vis));
memset(tree,0,sizeof(tree));
memset(&c,0,sizeof(&c));
scanf("%d %d",&n,&m);
for(int i=1;i<=n;i++)
fa[i]=i;
for(int i=0;i<m;i++)
scanf("%d %d %d",&c[i].a,&c[i].b,&c[i].cost);
sort(c,c+m,cmp1);
int sum=0;
for(int i=0;i<m;i++)
{
int x=find(c[i].a);
int y=find(c[i].b);
if(x!=y)
{
fa[x]=y,sum+=c[i].cost;
tree[x][y]=tree[y][x]=c[i].cost;
vis[i]=1;
}
}
int flag=0;
for(int i=0;i<m;i++)
{
if(!vis[i])
{
int flag1=0;
while(!s.empty())
s.pop();
memset(vis_tree,0,sizeof(vis_tree));
sec_tree(c[i].a,c[i].b);
node1 temp;
temp=s.top();
if(temp.cost==c[i].cost)
{
flag=1;
break;
}
}
}
if(!flag)
printf("%d
",sum);
else
printf("Not Unique!
");
}
}