As an emergency rescue team leader of a city, you are given a special map of your country. The map shows several scattered cities connected by some roads. Amount of rescue teams in each city and the length of each road between any pair of cities are marked on the map. When there is an emergency call to you from some other city, your job is to lead your men to the place as quickly as possible, and at the mean time, call up as many hands on the way as possible.
Input Specification:
Each input file contains one test case. For each test case, the first line contains 4 positive integers: N (≤500) - the number of cities (and the cities are numbered from 0 to N−1), M - the number of roads, C1 and C2 - the cities that you are currently in and that you must save, respectively. The next line contains N integers, where the i-th integer is the number of rescue teams in the i-th city. Then M lines follow, each describes a road with three integers c1, c2 and L, which are the pair of cities connected by a road and the length of that road, respectively. It is guaranteed that there exists at least one path from C1 to C2.
Output Specification:
For each test case, print in one line two numbers: the number of different shortest paths between C1 and C2, and the maximum amount of rescue teams you can possibly gather. All the numbers in a line must be separated by exactly one space, and there is no extra space allowed at the end of a line.
Sample Input:
5 6 0 2
1 2 1 5 3
0 1 1
0 2 2
0 3 1
1 2 1
2 4 1
3 4 1
Sample Output:
2 4
代码长度限制
16 KB
时间限制
400 ms
内存限制
64 MB
解题:
第一次 阅读完题目 作答的时候想到这是个无向图的数据结构,然后在脑子里构思了大概的想法,就想试试看用结构体,把每个城市包含的救援队数量、路径、路径通向的对象存放在结构体中。
先把图画好,然后从起始位置从c1开始,c1(0号城市),包含1个救援队、3条路径和3个对应路径链接的城市。
结构体可以这样设置成一个嵌套结构体:
typedef struct
{
int distance;
}Dist;//第一个结构体包含路径长度也就是两个城市的距离;
typedef struct
{
int num;
Dist dist[501];
}cityinf;//第二个结构体 包含救援队的数量以及结构体数组Dist,用Dist数组下表表示路径通向哪个城市,而cityinf的数组下标则表示该城市自己;
然后就按着这个思路继续写,初始化一个最短路径长度,遍历比较之后找到c1到c2之间最短的路径,然后将路径上的城市的救援队数量相加。
一开始读题目以为让输出的是最短路劲长度 结果后面才发现是让输出的 不同的最短路径长度的个数。。。。
按照我自己的思路做出来,发现只能过第一个测试。试了很多测试用例之后发现自己写的代码有问题,
当一个城市通向下一个城市的时候。如果这个城市有多条路径,按照我的代码跑起来就只会按照遍历顺序,通向满足条件的第一个城市,然后会陷入重复循环 下一层遍历继续走这条路,导致其实有很多路径 程序根本没有跑到。
然后删删改改去重新学了一下Dijkstra再参考了柳神的代码 终于做出来了
Part 1 错误代码 XXXXXXXXX
#include<stdio.h> typedef struct
{ int distance;
}Dist; typedef struct
{
int num;
Dist dist[501];
}cityinf; int main()
{
int i,j,l,n,m,c1,c2,tempc;
int shortdist=1000000,sumdist=0;//题目没有规定有多大就自己规定大一点;
int maxnum=0,sumnum=0;
cityinf city[501]; scanf("%d %d %d %d\n",&n,&m,&c1,&c2);
for(i=0;i<n;i++)
{
scanf("%d ",&city[i].num);
}
for(i=0;i<m;i++)
{
scanf("%d ",&j);
scanf("%d ",&l);
scanf("%d\n",&city[j].dist[l].distance);//这里没有考虑无向图,应该需要正反两个方向都行;
}
tempc=c1;
for(i=0;i<n;i++)
{
c1=tempc;//暂时存放c1;c1相当于起始城市
sumdist=0;//每次循环要把距离和还原;
sumnum=city[c1].num;
for(j=i;j<n;j++){
if(city[c1].dist[j].distance>0&&j!=c2)//一开始不能直接等于c2;
{
sumnum+=city[j].num;
sumdist+=city[c1].dist[j].distance;
c1=j;//在这里改变起始城市
//printf("test1 %d\n",c1);用来测试的
}
if(city[c1].dist[j].distance>0&&j==c2)//等于c2说明到达最终城市;
{
if(maxnum<sumnum+city[j].num)
{
maxnum=sumnum+city[j].num;
//printf("test2\n");测试二
}
if(shortdist>sumdist+city[c1].dist[j].distance)
{
shortdist=sumdist+city[c1].dist[j].distance;
//printf("test3\n");测试三
}
//printf("test4\n");测试四
break;
}
/*if(city[c1].dist[j].distance==0)//考虑距离等于0的特殊情况,但其实没必要
{
shortdist=0;
maxnum=city[c1].num;
printf("test5\n");
}*/
}
}
if(c1==c2)//想考虑起始城市等于终点城市,但是也没必要。。。。
{
printf("0 %d",city[c1].num);
}
else printf("%d %d",shortdist,maxnum);//输出最短距离和最大救援队数量
}
Part 2 正确答案
用num[]表示最短路径数量、w[]表示 最短路径上城市的最大救援队数量和、dis[i]则表示从起始点c1开始到i城市的最短路径长度;
格外设置bool类型数组 visit[]来作为判断“是否已经走过这个城市”的标识
#include<stdio.h> typedef struct
{
int distance;
}Dist; typedef struct
{
int num;
Dist dist[501];
}cityinf; int main()
{
int i,j,l,v,u,n,m,c1,c2;
int shortdist;
int num[501];
int w[501];
int dis[501];
cityinf city[501];
bool visit[501] = {0};
for(i=0;i<501;i++)
{
dis[i]=1000000;//初始化数组
for(j=0;j<501;j++)
{
city[i].dist[j].distance=1000000;//初始化结构体数组
}
}
scanf("%d %d %d %d\n",&n,&m,&c1,&c2);
for(i=0;i<n;i++)
{
scanf("%d ",&city[i].num);
}
for(i=0;i<m;i++)
{
scanf("%d ",&j);
scanf("%d ",&l);
scanf("%d\n",&city[j].dist[l].distance);
city[l].dist[j].distance=city[j].dist[l].distance;//处理无向图中的“无向”
}
dis[c1]=0;//只改变dis[]数组中c1的值;
w[c1]=city[c1].num;//只改变w[]数组中c1的值;
num[c1]=1;//只改变num[]数组中c1的值;
for(i=0;i<n;i++)
{
u = -1;//循环前给u记录判断标记;
shortdist=1000000;//随便给一个较大的值
for(j=0;j<n;j++)
{
if(visit[j] == false && dis[j]<shortdist)//判断是否走过这一个城市,并且这个城市的距离是路径中最小的
{
u=j;//把j作为新的起始城市; shortdist=dis[j];
}
}
if(u == -1) break;//如果没有新的起始城市可以选。就推出这一层循环;
visit[u] = true;//改变bool值 说明已经访问过u这个城市
for(v=0;v<n;v++)
{
if(visit[v]==false&&city[u].dist[v].distance!= 1000000)//如果V城市没被走过并且u-v之间存在路径;
{
if(dis[u]+city[u].dist[v].distance<dis[v])//如果到达u的最短路径+u-v的路径小于前面所得的“暂时的”从c1到达v的最短路径;
{
dis[v]=dis[u]+city[u].dist[v].distance;//更新
num[v] = num[u];//更新
w[v]=w[u]+city[v].num;//更新
}else if(dis[u]+city[u].dist[v].distance==dis[v])//如果到达u的最短路径+u-v的路径等于前面所得的“暂时的”从c1到达v的最短路径;
{
num[v] =num[v] + num[u];//说明num应该增加了;
if(w[u]+city[v].num>w[v])//判断是否需要更新w[]
{
w[v]=w[u]+city[v].num;
}
}
}
}
}
printf("%d %d",num[c2],w[c2]);
return 0;
}
