题目链接：

problemCode=1372">ZOJ1372 POJ 1287 Networking 网络设计

Networking

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Time Limit: 2 Seconds      Memory Limit: 65536 KB

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You are assigned to design network connections between certain points in a wide area. You are given a set of points in the area, and a set of possible routes for the cables that may connect
pairs of points. For each possible route between two points, you are given the length of the cable that is needed to connect the points over that route. Note that there may exist many possible routes between two given points. It is assumed that the given possible
routes connect (directly or indirectly) each two points in the area.



Your task is to design the network for the area, so that there is a connection (direct or indirect) between every two points (i.e., all the points are interconnected, but not necessarily by a direct cable), and that the total length of the used cable is minimal.

Input

The input file consists of a number of data sets. Each data set defines one required network. The first line of the set contains two integers: the first defines the number P of the given
points, and the second the number R of given routes between the points. The following R lines define the given routes between the points, each giving three integer numbers: the first two numbers identify the points, and the third gives the length of the route.
The numbers are separated with white spaces. A data set giving only one number P=0 denotes the end of the input. The data sets are separated with an empty line.



The maximal number of points is 50. The maximal length of a given route is 100. The number of possible routes is unlimited. The nodes are identified with integers between 1 and P (inclusive). The routes between two points i and j may be given as i j or as j
i.

Output

For each data set, print one number on a separate line that gives the total length of the cable used for the entire designed network.

Sample Input

1 0



2 3

1 2 37

2 1 17

1 2 68

3 7

1 2 19

2 3 11

3 1 7

1 3 5

2 3 89

3 1 91

1 2 32

5 7

1 2 5

2 3 7

2 4 8

4 5 11

3 5 10

1 5 6

4 2 12

0

Sample Output

0

17

16

26

题意：

设计一个网络连接某个区域的一些点。以及这些地点之间能够用网线连接的线路。对每条线路。给定了连接这两个地方所需网线的长度。

注意，两个地点之间的线路可能有多条。假定，给定的线路能够直接或间接地连接该地区中的全部地点。

试为这个地区设计一个网络系统。使得该地区全部地点都能够连接，而且使用的网线长度最短。

分析：

最小生成树，採用Kruskal算法可以规避重边的问题。由于边是依照长度从小到大排序，因而当选择了长度短的边后便不会选择长度更长的重边。

代码：

#include <iostream>

#include <cstdio>

#include <cstring>

#include <algorithm>

using namespace std;

#define maxm 1300

int parent[55];

int ans, m;

struct edge

{

    int u, v, w;

}EG[maxm];

bool cmp(edge a, edge b)

{

    return a.w < b.w;

}

int Find(int x)

{

    if(parent[x] == -1) return x;

    return Find(parent[x]);

}

void Kruskal()

{

    memset(parent, -1, sizeof(parent));

    ans = 0;

    sort(EG, EG+m, cmp);

    for(int i = 0; i < m; i++)

    {

        int t1 = Find(EG[i].u), t2 = Find(EG[i].v);

        if(t1 != t2)

        {

            ans += EG[i].w;

            parent[t1] = t2;

        }

    }

}

int main()

{

    int n;

    while(scanf("%d", &n), n)

    {

        scanf("%d", &m);

        for(int i = 0; i < m; i++)

            scanf("%d%d%d", &EG[i].u, &EG[i].v, &EG[i].w);

        Kruskal();

        printf("%d\n", ans);

    }

    return 0;

}