2014-11-11 10:58:15      个评论

# Conquer a New Region

Time Limit: 8000/4000 MS (Java/Others) Memory Limit: 32768/32768 K (Java/Others)
Total Submission(s): 1289 Accepted Submission(s): 429

Problem Description The wheel of the history rolling forward, our king conquered a new region in a distant continent.
There are N towns (numbered from 1 to N) in this region connected by several roads. It's confirmed that there is exact one route between any two towns. Traffic is important while controlled colonies are far away from the local country. We define the capacity C(i, j) of a road indicating it is allowed to transport at most C(i, j) goods between town i and town j if there is a road between them. And for a route between i and j, we define a value S(i, j) indicating the maximum traffic capacity between i and j which is equal to the minimum capacity of the roads on the route.
Our king wants to select a center town to restore his war-resources in which the total traffic capacities from the center to the other N - 1 towns is maximized. Now, you, the best programmer in the kingdom, should help our king to select this center.

Input There are multiple test cases.
The first line of each case contains an integer N. (1 <= N <= 200,000)
The next N - 1 lines each contains three integers a, b, c indicating there is a road between town a and town b whose capacity is c. (1 <= a, b <= N, 1 <= c <= 100,000)

Output For each test case, output an integer indicating the total traffic capacity of the chosen center town.
Sample Input
4
1 2 2
2 4 1
2 3 1
4
1 2 1
2 4 1
2 3 1

Sample Output
4
3

Source 2012 Asia ChangChun Regional Contest
#include
#include
#include
#include
#include
#include
#include
#include
#include
#include
#include
#include
#include
#include
#include
using namespace std;
#define MAXN 200000 + 200
typedef __int64 LL;

struct node{
LL x;
LL y;
LL cost;
}E[MAXN];

LL f[MAXN];//父亲节点
LL dis[MAXN];//与该节点相连所有的点到该节点的权值的和
LL sum[MAXN];//该节点的儿子数

bool cmp(node a,node b){
return a.cost > b.cost;
}

LL find(LL x){
if(x == f[x]){
return x;
}
return f[x] = find(f[x]);
}

void init(){
LL i;
for(i=0;i dis2){
unio(dy,dx,dis1);
}
else{
unio(dx,dy,dis2);
}
}
printf("%I64d\n",dis[find(1)]);
}

return 0;
}