ZOJ 1221 Risk(最短路径Dijkstra和Floyd算法)
2011-12-03 22:46
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Risk
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Time Limit: 2 Seconds Memory Limit: 65536 KB
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Risk is a board game in which several opposing players attempt to conquer the world. The gameboard consists of a world map broken up into hypothetical countries. During a player's turn, armies stationed in one country are only allowed to attack only countries with which they share a common border. Upon conquest of that country, the armies may move into the newly conquered country.
During the course of play, a player often engages in a sequence of conquests with the goal of transferring a large mass of armies from some starting country to a destination country. Typically, one chooses the intervening countries so as to minimize the total number of countries that need to be conquered. Given a description of the gameboard with 20 countries each with between 1 and 19 connections to other countries, your task is to write a function that takes a starting country and a destination country and computes the minimum number of countries that must be conquered to reach the destination. You do not need to output the sequence of countries, just the number of countries to be conquered including the destination. For example, if starting and destination countries are neighbors, then your program should return one.
The following connection diagram illustrates the sample input.
Input
Input to your program will consist of a series of country configuration test sets. Each test set will consist of a board description on lines 1 through 19. The representation avoids listing every national boundary twice by only listing the fact that country I borders country J when I < J. Thus, the Ith line, where I is less than 20, contains an integer X indicating how many "higher-numbered" countries share borders with country I, then X distinct integers J greater than I and not exceeding 20, each describing a boundary between countries I and J. Line 20 of the test set contains a single integer (1 <= N <= 100) indicating the number of country pairs that follow. The next N lines each contain exactly two integers (1 <= A,B <= 20; A!=B) indicating the starting and ending countries for a possible conquest.
There can be multiple test sets in the input; your program should continue reading and processing until reaching the end of file. There will be at least one path between any two given countries in every country configuration.
Output
For each input set, your program should print the following message "Test Set #T" where T is the number of the test set starting with 1. The next NT lines each will contain the result for the corresponding test in the test set - that is, the minimum number of countries to conquer. The test result line should contain the start country code A the string " to " the destination country code B ; the string ": " and a single integer indicating the minimum number of moves required to traverse from country A to country B in the test set. Following all result lines of each input set, your program should print a single blank line.
Sample Input
1 3
2 3 4
3 4 5 6
1 6
1 7
2 12 13
1 8
2 9 10
1 11
1 11
2 12 17
1 14
2 14 15
2 15 16
1 16
1 19
2 18 19
1 20
1 20
5
1 20
2 9
19 5
18 19
16 20
Sample Output
Test Set #1
1 to 20: 7
2 to 9: 5
19 to 5: 6
18 to 19: 2
16 to 20: 2
[align=center][/align]
Source: South Central USA 1997
Submit Status
解题报告:题意:就是求最短路径,一共有20个顶点,一开始是19行,每一行第一个数代表与这个顶点相连的个数,后面就是他们的关系!且每个权值都为1,最短路径可以用Dijkstra算法和Floyd算法实现,因为很久没有写最短路径的代码了!的确有点生!用Dijkstra算法时一开始TLE(输入的问题)又PE(粗心没有注意到换行)了一回!哎!悲惨呀,下面是两个算法的实现!
方法一:Dijkstra(迪杰斯特拉算法)
代码如下:
方法二:Floyd(弗洛伊德算法)
代码如下:
[align=center][/align]
Time Limit: 2 Seconds Memory Limit: 65536 KB
[align=center][/align]
Risk is a board game in which several opposing players attempt to conquer the world. The gameboard consists of a world map broken up into hypothetical countries. During a player's turn, armies stationed in one country are only allowed to attack only countries with which they share a common border. Upon conquest of that country, the armies may move into the newly conquered country.
During the course of play, a player often engages in a sequence of conquests with the goal of transferring a large mass of armies from some starting country to a destination country. Typically, one chooses the intervening countries so as to minimize the total number of countries that need to be conquered. Given a description of the gameboard with 20 countries each with between 1 and 19 connections to other countries, your task is to write a function that takes a starting country and a destination country and computes the minimum number of countries that must be conquered to reach the destination. You do not need to output the sequence of countries, just the number of countries to be conquered including the destination. For example, if starting and destination countries are neighbors, then your program should return one.
The following connection diagram illustrates the sample input.
Input
Input to your program will consist of a series of country configuration test sets. Each test set will consist of a board description on lines 1 through 19. The representation avoids listing every national boundary twice by only listing the fact that country I borders country J when I < J. Thus, the Ith line, where I is less than 20, contains an integer X indicating how many "higher-numbered" countries share borders with country I, then X distinct integers J greater than I and not exceeding 20, each describing a boundary between countries I and J. Line 20 of the test set contains a single integer (1 <= N <= 100) indicating the number of country pairs that follow. The next N lines each contain exactly two integers (1 <= A,B <= 20; A!=B) indicating the starting and ending countries for a possible conquest.
There can be multiple test sets in the input; your program should continue reading and processing until reaching the end of file. There will be at least one path between any two given countries in every country configuration.
Output
For each input set, your program should print the following message "Test Set #T" where T is the number of the test set starting with 1. The next NT lines each will contain the result for the corresponding test in the test set - that is, the minimum number of countries to conquer. The test result line should contain the start country code A the string " to " the destination country code B ; the string ": " and a single integer indicating the minimum number of moves required to traverse from country A to country B in the test set. Following all result lines of each input set, your program should print a single blank line.
Sample Input
1 3
2 3 4
3 4 5 6
1 6
1 7
2 12 13
1 8
2 9 10
1 11
1 11
2 12 17
1 14
2 14 15
2 15 16
1 16
1 19
2 18 19
1 20
1 20
5
1 20
2 9
19 5
18 19
16 20
Sample Output
Test Set #1
1 to 20: 7
2 to 9: 5
19 to 5: 6
18 to 19: 2
16 to 20: 2
[align=center][/align]
Source: South Central USA 1997
Submit Status
解题报告:题意:就是求最短路径,一共有20个顶点,一开始是19行,每一行第一个数代表与这个顶点相连的个数,后面就是他们的关系!且每个权值都为1,最短路径可以用Dijkstra算法和Floyd算法实现,因为很久没有写最短路径的代码了!的确有点生!用Dijkstra算法时一开始TLE(输入的问题)又PE(粗心没有注意到换行)了一回!哎!悲惨呀,下面是两个算法的实现!
方法一:Dijkstra(迪杰斯特拉算法)
代码如下:
#include <iostream> #include <cstdio> #include <cstring> #include <cstdlib> using namespace std; const int N = 25; const int INF=99999999; int visit ,map ,dis ; void Dijkstra(int begin,int end) { int i,j,mark,min; memset(dis,0,sizeof(dis)); memset(visit,0,sizeof(visit)); for(i=1;i<=20;i++) { dis[i]=map[begin][i]; } visit[begin]=1; dis[begin]=0; for(i=1;i<=20;i++) { min=INF; for(j=1;j<=20;j++) { if(!visit[j]&&min>dis[j]) { min=dis[j]; mark=j; } } if(min==INF) { break; } visit[mark]=1; for(j=1;j<=20;j++) { if(!visit[j]&&dis[j]>map[mark][j]+dis[mark]) { dis[j]=map[mark][j]+dis[mark]; } } } } int main() { int i,count,j,n,k,v,begin,end; count=1; while(scanf("%d",&k)!=EOF) { memset(map,0,sizeof(map));//初始化 for(i=0;i<=N;i++) { for(j=0;j<=N;j++) { map[i][j]=INF; } } for(j=0;j<k;j++)//对输入第一行的特殊处理 { scanf("%d",&v); map[1][v]=map[v][1]=1; } for(i=2;i<=19;i++) { scanf("%d",&k); for(j=0;j<k;j++) { scanf("%d",&v); map[i][v]=map[v][i]=1; } } printf("Test Set #%d\n",count); count++; scanf("%d",&n); for(i=0;i<n;i++) { scanf("%d%d",&begin,&end); Dijkstra(begin,end); printf("%d to %d: %d\n",begin,end,dis[end]); } printf("\n"); } return 0; }
方法二:Floyd(弗洛伊德算法)
代码如下:
#include <iostream> #include <cstdio> #include <cstring> #include <cstdlib> using namespace std; const int N = 25; const int INF=99999999; int map ; void Floyd(int n) { int i,j,k; for(k=1;k<=20;k++) { for(i=1;i<=20;i++) { for(j=1;j<=20;j++) { if(map[i][j]>map[i][k]+map[k][j]) { map[i][j]=map[i][k]+map[k][j]; } } } } } int main() { int i,count,j,n,k,v,begin,end; count=1; while(scanf("%d",&k)!=EOF) { memset(map,0,sizeof(map)); for(i=0;i<=N;i++) { for(j=0;j<=N;j++) { if(i==j) { map[i][j]=0; } else { map[i][j]=INF; } } } for(j=0;j<k;j++) { scanf("%d",&v); map[1][v]=map[v][1]=1; } for(i=2;i<=19;i++) { scanf("%d",&k); for(j=0;j<k;j++) { scanf("%d",&v); map[i][v]=map[v][i]=1; } } Floyd(20); printf("Test Set #%d\n",count); count++; scanf("%d",&n); for(i=0;i<n;i++) { scanf("%d%d",&begin,&end); printf("%d to %d: %d\n",begin,end,map[begin][end]); } printf("\n"); } return 0; }
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