http://acm.hdu.edu.cn/showproblem.php?pid=5441
Travel
Time Limit: 1500/1000 MS (Java/Others) Memory Limit: 131072/131072 K (Java/Others)
Total Submission(s): 2061 Accepted Submission(s): 711
Problem Description
Jack likes to travel around the world, but he doesn’t like to wait. Now, he is traveling in the Undirected Kingdom. There are n cities and m bidirectional roads connecting the cities. Jack hates waiting too long on the bus, but he can rest at every city. Jack can only stand staying on the bus for a limited time and will go berserk after that. Assuming you know the time it takes to go from one city to another and that the time Jack can stand staying on a bus is x minutes, how many pairs of city (a,b) are there that Jack can travel from city a to b without going berserk?
Input
The first line contains one integer T,T≤5, which represents the number of test case.
For each test case, the first line consists of three integers n,m and q where n≤20000,m≤100000,q≤5000. The Undirected Kingdom has n cities and mbidirectional roads, and there are q queries.
Each of the following m lines consists of three integers a,b and d where a,b∈{1,...,n} and d≤100000. It takes Jack d minutes to travel from city a to city band vice versa.
Then q lines follow. Each of them is a query consisting of an integer x where x is the time limit before Jack goes berserk.
For each test case, the first line consists of three integers n,m and q where n≤20000,m≤100000,q≤5000. The Undirected Kingdom has n cities and mbidirectional roads, and there are q queries.
Each of the following m lines consists of three integers a,b and d where a,b∈{1,...,n} and d≤100000. It takes Jack d minutes to travel from city a to city band vice versa.
Then q lines follow. Each of them is a query consisting of an integer x where x is the time limit before Jack goes berserk.
Output
You should print q lines for each test case. Each of them contains one integer as the number of pair of cities (a,b) which Jack may travel from a to b within the time limit x.
Note that (a,b) and (b,a) are counted as different pairs and a and b must be different cities.
Note that (a,b) and (b,a) are counted as different pairs and a and b must be different cities.
Sample Input
1
5 5 3
2 3 6334
1 5 15724
3 5 5705
4 3 12382
1 3 21726
6000
10000
13000
Sample Output
2
6
12
题意:是有n个城市,m条边包含u v w;代表u到v的时间是w;
给q的时间x,求在x时间内Jack可以到达多少对城市;其中ab和ba是不同的;
1
5 5 3
2 3 6334
1 5 15724
3 5 5705
4 3 12382
1 3 21726
6000 ///可以到达35和53;
10000 ///2 5 3是可以相互到达的所以有6种;
13000 ///2 3 5 4是相通的有12种;
Source
#include <cstdio> #include <cstring> #include <cstdlib> #include <iostream> #include <algorithm> using namespace std; #define N 100100 struct node { int u, v, w, index; } a[N], b[N]; int r[N], f[N], Q[N]; int cmp(node n1, node n2) { return n1.w < n2.w; } int Find(int x) { if(x!=f[x]) f[x]=Find(f[x]); return f[x]; } int main() { int t; scanf("%d", &t); while(t--) { int n, m, q, i; scanf("%d%d%d", &n, &m, &q); for(i=0; i<=n; i++) { f[i] = i; r[i] = 1; } for(i=0; i<m; i++) scanf("%d%d%d", &a[i].u, &a[i].v, &a[i].w); for(i=0; i<q; i++) { scanf("%d", &b[i].w); b[i].index = i; } sort(a, a+m, cmp); sort(b, b+q, cmp); int sum = 0, j = 0; for(i=0; i<q; i++) { while(j<m && a[j].w<=b[i].w) { int fu = Find(a[j].u); int fv = Find(a[j].v); if(fu!=fv) { f[fu] = fv; sum += r[fu]*r[fv]; ///两个集合的任意组合 r[fv] += r[fu]; ///r[i]代表i的根节点所包含的元素的个数 } j++; } Q[b[i].index] = sum*2; ///ab和ba是不一样的 } for(i=0; i<q; i++) printf("%d ", Q[i]); } return 0; }