Pavel plays a famous computer game. A player is responsible for a whole country and he can travel there freely, complete quests and earn experience.
This country has n cities connected by m bidirectional roads of different lengths so that it is possible to get from any city to any other one. There are portals in k of these cities. At the beginning of the game all portals are closed. When a player visits a portal city, the portal opens. Strange as it is, one can teleport from an open portal to an open one. The teleportation takes no time and that enables the player to travel quickly between rather remote regions of the country.
At the beginning of the game Pavel is in city number 1. He wants to open all portals as quickly as possible. How much time will he need for that?
The first line contains two space-separated integers n and m (1 ≤ n ≤ 105, 0 ≤ m ≤ 105) that show how many cities and roads are in the game.
Each of the next m lines contains the description of a road as three space-separated integers xi, yi, wi (1 ≤ xi, yi ≤ n, xi ≠ yi, 1 ≤ wi ≤ 109) — the numbers of the cities connected by the i-th road and the time needed to go from one city to the other one by this road. Any two cities are connected by no more than one road. It is guaranteed that we can get from any city to any other one, moving along the roads of the country.
The next line contains integer k (1 ≤ k ≤ n) — the number of portals.
The next line contains k space-separated integers p1, p2, ..., pk — numbers of the cities with installed portals. Each city has no more than one portal.
Print a single number — the minimum time a player needs to open all portals.
Please, do not use the %lld specifier to read or write 64-bit integers in C++. It is preferred to use the cin, cout streams or the %I64d specifier.
3 3
1 2 1
1 3 1
2 3 1
3
1 2 3
2
4 3
1 2 1
2 3 5
2 4 10
3
2 3 4
16
4 3
1 2 1000000000
2 3 1000000000
3 4 1000000000
4
1 2 3 4
3000000000
1 #include <iostream> 2 #include <cstdio> 3 #include <cstring> 4 #include <cmath> 5 #include <algorithm> 6 #include <climits> 7 #include <vector> 8 #include <queue> 9 #include <cstdlib> 10 #include <string> 11 #include <set> 12 #define LL long long 13 #define INF 0x3f3f3f3f3f3f3f3f 14 #define mk make_pair 15 using namespace std; 16 const int maxn = 100010; 17 int uf[maxn],be[maxn]; 18 LL d[maxn]; 19 bool vis[maxn] = {false}; 20 vector< pair<int,int> >g[maxn]; 21 vector< pair<LL,pair<int,int> > >e; 22 priority_queue< pair<LL,int> >q; 23 int Find(int x){ 24 if(uf[x] != x) 25 uf[x] = Find(uf[x]); 26 return uf[x]; 27 } 28 int main(){ 29 int u,v,i,k,tu,tv,n,m; 30 LL w,ans = 0; 31 scanf("%d%d",&n,&m); 32 for(i = 0; i < m; i++){ 33 scanf("%d%d%I64d",&u,&v,&w); 34 g[u].push_back(mk(v,w)); 35 g[v].push_back(mk(u,w)); 36 } 37 memset(d,3,sizeof(d)); 38 scanf("%d",&k); 39 for(i = 0; i < k; i++){ 40 scanf("%d",&u); 41 d[u] = 0; 42 uf[u] = u; 43 be[u] = u; 44 q.push(mk(0,u)); 45 } 46 while(!q.empty()){ 47 u = q.top().second; 48 q.pop(); 49 if(vis[u]) continue; 50 vis[u] = true; 51 for(i = 0; i < g[u].size(); i++){ 52 v = g[u][i].first; 53 w = g[u][i].second; 54 if(be[v]) e.push_back(mk(d[u]+d[v]+w,mk(be[u],be[v]))); 55 if(d[v] > d[u]+w){ 56 d[v] = d[u]+w; 57 be[v] = be[u]; 58 q.push(mk(-d[v],v)); 59 } 60 } 61 } 62 sort(e.begin(),e.end()); 63 for(i = 0; i < e.size(); i++){ 64 u = e[i].second.first; 65 v = e[i].second.second; 66 tu = Find(u); 67 tv = Find(v); 68 if(tu != tv){ 69 ans += e[i].first; 70 uf[tu] = tv; 71 } 72 } 73 printf("%I64d\n",ans+d[1]); 74 return 0; 75 }