题目描述
The N cows (2 <= N <= 1,000) conveniently numbered 1..N are grazing among the N pastures also conveniently numbered 1..N. Most conveniently of all, cow i is grazing in pasture i.
Some pairs of pastures are connected by one of N-1 bidirectional walkways that the cows can traverse. Walkway i connects pastures A_i and B_i (1 <= A_i <= N; 1 <= B_i <= N) and has a length of L_i (1 <= L_i <= 10,000).
The walkways are set up in such a way that between any two distinct pastures, there is exactly one path of walkways that travels between them. Thus, the walkways form a tree.
The cows are very social and wish to visit each other often. Ever in a hurry, they want you to help them schedule their visits by computing the lengths of the paths between 1 <= L_i <= 10,000 pairs of pastures (each pair given as a query p1,p2 (1 <= p1 <= N; 1 <= p2 <= N).
POINTS: 200
有N(2<=N<=1000)头奶牛,编号为1到W,它们正在同样编号为1到N的牧场上行走.为了方 便,我们假设编号为i的牛恰好在第i号牧场上.
有一些牧场间每两个牧场用一条双向道路相连,道路总共有N - 1条,奶牛可以在这些道路 上行走.第i条道路把第Ai个牧场和第Bi个牧场连了起来(1 <= A_i <= N; 1 <= B_i <= N),而它的长度 是 1 <= L_i <= 10,000.在任意两个牧场间,有且仅有一条由若干道路组成的路径相连.也就是说,所有的道路构成了一棵树.
奶牛们十分希望经常互相见面.它们十分着急,所以希望你帮助它们计划它们的行程,你只 需要计算出Q(1 < Q < 1000)对点之间的路径长度•每对点以一个询问p1,p2 (1 <= p1 <= N; 1 <= p2 <= N). 的形式给出.
输入格式
* Line 1: Two space-separated integers: N and Q
* Lines 2..N: Line i+1 contains three space-separated integers: A_i, B_i, and L_i
* Lines N+1..N+Q: Each line contains two space-separated integers representing two distinct pastures between which the cows wish to travel: p1 and p2
输出格式
* Lines 1..Q: Line i contains the length of the path between the two pastures in query i.
输入输出样例
4 2 2 1 2 4 3 2 1 4 3 1 2 3 2
2 7
说明/提示
Query 1: The walkway between pastures 1 and 2 has length 2.
Query 2: Travel through the walkway between pastures 3 and 4, then the one between 4 and 1, and finally the one between 1 and 2, for a total length of 7.
Floyd 的复杂度大家都知道是 O(n^3)O(n3),但是我们可以剪枝。我们都知道 Floyd 初始需要把 distdist 数组初始化为 infty∞,所以当我们进行第二层循环时,如果当前 dist(i, k) = inftydist(i,k)=∞ 就可以直接跳过。
#include<cstdio> #include<cstring> #define min(a, b) ((a) < (b) ? (a) : (b)) using namespace std; const int MaxN = 1e3; const int INF = 0x3f3f3f3f; int d[MaxN + 1][MaxN + 1]; int N, Q; inline int read(){ int s=0,w=1; char ch=getchar(); while(ch<'0'||ch>'9'){ if(ch=='-'){ w=-1; } ch=getchar(); } while(ch>='0'&&ch<='9'){ s=s*10+ch-'0'; ch=getchar(); } return s*w; } int main(){ memset(d, 0x3f, sizeof(d)); N=read(); Q=read(); for (int i = 1, A, B, L; i < N; ++i) { A=read(); B=read(); L=read(); d[A][B] = d[B][A] = L; } for (int k = 1; k <= N; ++k) for (int i = 1; i <= N; ++i) { if (d[i][k] == INF){ continue; } for (int j = 1; j <= N; ++j){ d[i][j] = min(d[i][j], d[i][k] + d[k][j]); } } for (int P1, P2; Q--; ) { P1=read(); P2=read(); printf("%d ", d[P1][P2]); } return 0; }